 |
 Previous Article | Next Article 
The Journal of Neuroscience, October 15, 1998, 18(20):8261-8277
The Endogenous Calcium Buffer and the Time Course of Transducer
Adaptation in Auditory Hair Cells
A. J.
Ricci,
Y-C.
Wu, and
R.
Fettiplace
Department of Physiology, University of Wisconsin Medical School,
Madison, Wisconsin 53706
 |
ABSTRACT |
Mechanoelectrical transducer currents in turtle auditory hair cells
adapt to maintained stimuli via a Ca2+-dependent
mechanism that is sensitive to the level of internal calcium buffer. We
have used the properties of transducer adaptation to compare the
effects of exogenous calcium buffers in the patch electrode solution
with those of the endogenous buffer assayed with perforated-patch
recording. The endogenous buffer of the hair bundle was
equivalent to 0.1-0.4 mM BAPTA and, in a majority of
cells, supported adaptation in an external Ca2+
concentration of 70 µM similar to that in turtle
endolymph. The endogenous buffer had a higher effective concentration,
and the adaptation time constant was faster in cells at the
high-frequency end than at the low-frequency end of the cochlea.
Experiments using buffers with different
Ca2+-binding rates or dissociation constants
indicated that the speed of adaptation and the resting open probability
of the transducer channels could be differentially regulated and imply
that the endogenous buffer must be a fast, high-affinity buffer. In
some hair cells, the transducer current did not decay exponentially during a sustained stimulus but displayed damped oscillations at a
frequency (58-230 Hz) that depended on external
Ca2+ concentration. The gradient in adaptation time
constant and the tuned transducer current at physiological levels of
calcium buffer and external Ca2+ suggest that
transducer adaptation may contribute to hair cell frequency
selectivity. The results are discussed in terms of feedback regulation
of transducer channels mediated by Ca2+ binding at
two intracellular sites.
Key words:
adaptation; BAPTA; calcium buffers; feedback; hair cell; mechanoelectrical transduction; frequency tuning
| |
INTRODUCTION |
Ca2+ regulates a
variety of intracellular processes, but its efficiency as a signaling
agent depends on the degree of sequestration by cytoplasmic calcium
buffers. Mobile buffers like calbindin and parvalbumin are especially
important because they have a high Ca2+ affinity and
can be continually replenished by diffusion of free buffer into a
region of elevated Ca2+ (Roberts, 1994 ).
Consequently, such buffers can establish standing gradients in free
Ca2+ in the vicinity of a Ca2+
source like a membrane ion channel (Neher, 1986; Stern, 1992); they can
also affect the magnitude and spatial extent of a
Ca2+ transient caused by a brief channel opening
(Chard et al., 1993). In patch-electrode recordings, an extrinsic
calcium buffer is normally added to the internal solution. When the
roles of calcium-dependent processes are being studied, the performance
of this extrinsic buffer should, as far as possible, match the
endogenous calcium buffer. The characteristics of the native buffer can
be estimated by comparing the behavior of the cell in whole-cell
recording to that in perforated-patch recording in which proteinaceous
calcium buffers are retained in the cytoplasm (Zhou and Neher, 1993;
Tucker and Fettiplace, 1996).
Ca2+ plays an important signaling role in hair cells
by regulating adaptation of the mechanoelectrical transducer channels
(Eatock et al., 1987; Assad et al., 1989; Crawford et al., 1989). In
response to a sustained deflection of the hair bundle, the
transducer current rapidly activates but subsequently declines from
its peak amplitude. This process of adaptation adjusts the
operating range of the transducer to preserve a high sensitivity
(Eatock et al., 1987) via a mechanism that requires entry of
Ca2+ through the open transducer channels (Assad et
al., 1989; Crawford et al., 1989; Ricci and Fettiplace, 1998). In
turtle hair cells, the time course of adaptation and the fraction of
transducer current activated at the position of the unperturbed bundle
depend both on external Ca2+ concentration and on
the level of intracellular calcium buffer (Ricci and Fettiplace, 1997,
1998). To assess the physiological contribution of transducer
adaptation, it is important to have an estimate of the level of
endogenous Ca2+ buffer in the hair bundle. In the
turtle cochlea, the hair cells are arranged tonotopically, the
characteristic frequency of a cell varying with position along the
cochlea (Crawford and Fettiplace, 1980). The time course of adaptation
recorded with electrodes containing a fixed concentration of exogenous
buffer also depends on hair cell location (Ricci and Fettiplace, 1997).
Do the tonotopic variations in adaptation persist under physiological
conditions?
To address these topics, we have used the properties of transducer
adaptation to compare the effects of exogenous calcium buffers like
BAPTA and EGTA introduced through the patch electrode with those of the
endogenous buffer assayed with perforated-patch recording. By recording
transducer currents at two separate locations, we provide evidence for
a gradient in both the calcium buffer and the adaptation time constant.
An unexpected finding was that under ionic conditions resembling those
in vivo, the voltage-clamped transducer current
displayed resonance-like behavior signifying that mechanotransduction
may contribute to the frequency selectivity of the cell.
| |
MATERIALS AND METHODS |
Preparation, recording, and stimulation. The
preparation and method of hair cell stimulation in the intact basilar
papilla were similar to procedures previously detailed (Crawford and
Fettiplace, 1985; Ricci and Fettiplace, 1997). Turtles (Trachemys
scripta elegans, carapace length 100-125 mm) were decapitated,
and the cochlear duct and lagena were dissected out. The cochlea was
opened, and the tectorial membrane was lifted off after ~20 min
digestion in saline (composition, in mM: NaCl, 125; KCl, 4;
CaCl2, 2.8; MgCl2, 2.2; Na
pyruvate, 2; glucose 8; and Na-HEPES, 10, pH 7.6) containing up to 0.1 mg/ml of protease (Sigma type XXIV). The preparation was transferred to
a Sylgard well in the recording chamber and secured, hair bundles
uppermost, with strands of dental floss tensioned on insect pins; the
tension could be adjusted so that most of the hair bundles lay in the
same focal plane. The chamber was mounted on the stage of a Zeiss
Axioskop FS microscope and viewed with Nomarski optics through a 63×
water-immersion objective (NA = 0.9), a 1.6× optovar, and a
Hamamatsu C2400 CCD camera.
Whole-cell currents were measured with a List EPC-7 amplifier
attached to a borosilicate patch electrode. The patch electrode was
advanced from the abneural edge of the basilar papilla along a track at
the level of the cell bodies rupturing intervening supporting cells to
make contact with the basolateral aspect of a hair cell (Ricci and
Fettiplace, 1997). At the end of an experiment, the location of the
hair cell and the total length of the basilar papilla were documented.
Most recordings were made from cells in two regions, one at ~0.3 and
the other at ~0.6 of the distance along the cochlea from the
low-frequency (lagenar) end. The properties of the transducer current
depended on the maximum amplitude of the current (Ricci and Fettiplace,
1997), variations that introduced substantial scatter in the measured
parameters. To minimize such variation, cells with current amplitudes
less than half of the maximum observable at a given position were
normally excluded from the averages. Unless otherwise stated, values of
current parameters are given as means ± 1 SEM. Transducer
currents and other experimental signals were stored on a Sony
PCM instrumentation recorder at a band width of 0-20 kHz.
Experiments were performed at 22-24°C.
Hair bundles were stimulated with a rigid glass pipette (tip
fire-polished to ~1 µm in diameter) cemented to a piezoelectric bimorph (Crawford et al., 1989). The bimorph was driven differentially with voltage steps, filtered with an 8-pole bessel at 3 kHz and amplified through a high-voltage driver of 20-fold gain, to yield a
fast stimulator with a 10-90% rise time of ~100 µsec. The time course of the glass probe was calibrated by projecting its image onto a
pair of photodiodes as described previously (Crawford and Fettiplace,
1985). The displacement noise in the motion of the probe was <5 nm
peak-to-peak. The glass probe was acid-cleaned at the start of each
experiment so that it would adhere to the hair bundle membrane, thus
ensuring that the bundle would follow faithfully both positive and
negative movements of the probe.
Extracellular and intracellular solutions. The preparation
was perfused with a saline of composition (in mM): NaCl,
128; KCl, 0.5; CaCl2, 2.8; MgCl2,
2.2; Na pyruvate, 2; glucose 8; and Na-HEPES, 10, pH 7.6. The upper
surface of the hair cell epithelium facing the endolymphatic
compartment was separately and continuously perfused by a large
pipette, 100 µm internal diameter, introduced into the cochlear duct.
The perfusion pipette was connected to a six-inlet manifold (Warner
Instruments, Hamden, CT) fed from a peristaltic pump (Gilson, Madison
WI), a given inlet being selected by means of a remotely controlled
miniature solenoid valve (Lee Products, Westbrook, CT). The perfusion
rate was kept low to prevent inadvertent stimulation of the bundles and
to localize the fluid stream around the cell being studied. The
exchange time for wash-in of the endolymph solution was ~1 min but,
in practice, 3-5 min were allowed after a solution change before
making a new measurement. The artificial endolymph solutions had ionic
compositions (in mM) of: NaCl, 130; KCl, 0.5; Na pyruvate,
2; glucose 8; and HEPES, 10, pH 7.6, with free Ca2+
concentrations of 0.07, 0.35, 1, and 2.8 mM. The
[Ca2+] in all solutions was measured with a
calcium electrode (MI 100, Microelectrodes Inc., Londonderry, NH). It
should be noted that endolymph in vivo also contains a high
K+ concentration, but this was not used as the major
monovalent ion in these experiments because it tended to shorten the
recording time, possibly because of K+ leakage to
the basolateral surface of the hair cell.
Whole-cell electrodes were filled with an internal solution of
composition (in mM): CsCl, 125; Na2ATP, 3;
MgCl2, 2; and Cs-HEPES, 10, adjusted to pH 7.2 with
CsOH, with the addition of various amounts of the calcium buffers:
BAPTA, 5,5'-dibromo-BAPTA, 5-nitro-BAPTA, 5,5',6,6'-tetrafluoro-BAPTA
(Molecular Probes, Eugene, OR), or EGTA (Fluka, Ronkonkoma, NY). Buffer
concentrations of 0.1-10 mM were used, and with the
highest concentration, the CsCl was reduced to keep the osmolarity
constant. After application of up to 50% series resistance
compensation, the electrode access resistance was 3-10 M , which
gave a recording time constant of 45-150 µsec. Transducer currents
were measured at a holding potential which, when corrected for the
junction potential introduced by the internal solution, was  90
mV.
Perforated-patch recordings. The technique for
perforated-patch recordings was similar to that originally described
(Horn and Marty, 1988; Rae et al., 1991) and recently applied to
isolated hair cells (Tucker and Fettiplace, 1996). The electrode
solution contained (in mM): CsAspartate, 110; CsCl, 15;
Na2ATP, 3; MgCl2, 2;
Cs4-BAPTA, 0.1 or 1; and Na-HEPES, 10, neutralized to pH
7.2 with CsOH. For each experiment, 2.4 mg of nystatin (Calbiochem, San
Diego, CA) was dissolved in 10 µl of dry dimethyl sulfoxide and
diluted 1:1000 into the stock intracellular solution. The patch pipette
was tip-filled with antibiotic-free stock solution and back-filled with
the nystatin solution to prevent the antibiotic leaking into the bath
during penetration of the papilla and sealing to the membrane. Access
resistances in perforated-patch mode were 11-29 M (mean ± SD = 17 ± 5 M) which, after applying up to 40% series
resistance compensation, were reduced to 7-23 M (mean = 12 ± 4 M). Potentials were adjusted for the junction potential between the Cs aspartate solution and the external saline (~10 mV
greater than that measured with the CsCl internal solution) to produce
a holding potential of 90 mV.
Diffusion of the nystatin to the tip of the electrode and perforation
of the enclosed patch could take 10-15 min after attaining a seal, and
during this period there was some concern that the patch had ruptured
spontaneously. To eliminate this possibility, in early experiments, a
fluorescent marker, Lucifer yellow was added at 1 mM to the
electrode solution. The preparation was then viewed with
epifluorescence illumination from a 100 W mercury lamp, passed through
a remotely controlled Uniblitz shutter and a 450-490 excitation
filter. The fluorescence emission was long-pass filtered at 520 nm and
imaged with an intensified CCD camera (Hamamatsu C2400). During the
perforated-patch recording, the fluorescent dye was confined to the
electrode, but after deliberately rupturing the patch, the dye quickly
gained access to the cell interior (Fig.
1).
View larger version (60K):
[in this window]
[in a new window]
|
Figure 1.
Perforated-patch recordings of the hair cell
transducer current. A, Photomicrographs of part of the
high-frequency region of the turtle basilar papilla viewed with
Nomarski optics (left) and in epifluorescence
illumination (middle and right). The
focal plane is about halfway down the hair cell from the hair bundle.
The patch electrode contained Lucifer yellow, which cannot enter the
cell in the perforated-patch mode (middle) but gains
access to the cytoplasm on attaining the whole-cell configuration
(right). B, Families of hair cell
transducer currents obtained with perforated-patch recording in
external solutions superfusing the hair bundle that contained 2.8 mM and 0.07 mM Ca2+. Note
that the transducer currents still displayed adaptation in a
Ca2+ concentration of 0.07 mM resembling
that in turtle endolymph. The maximum current was larger in low
Ca2+ because of relief of external block of the
transducer channels (Ricci and Fettiplace, 1998). The time course of
the bundle deflection is shown above the current records that are
averages of 5-25 responses. In this and all subsequent figures, the
holding potential was 90 mV, and the zero on the ordinate scale
corresponds to the current level obtained with a large negative
stimulus, at which the transducer conductance was fully turned
off.
|
|
Fluorescence from the Lucifer yellow (molecular weight, 457 Da) would
typically invade the cell body and hair bundle to reach a steady state
within 2 min of patch rupture, which suggests that the contents of the
patch solution quickly diffuse into the cell. From the electrode
resistances, it can be estimated (Oliva et al., 1988) that the time
constant of "wash-in" for a substance the size of BAPTA is ~2-3
min. In practice, with whole-cell recording, at least 5 min were
allowed after breaking the membrane patch for the electrode solution
and especially the exogenous calcium buffers, to exchange with the
cytoplasmic constituents. After such a period of equilibration there
were no marked changes in the characteristics of the transducer current
for the duration of a whole-cell recording that might last 30 min. It
seems likely, therefore, that the concentration of exogenous buffer in
the cell was comparable to that in the electrode. If the exogenous
buffer did not fully equilibrate in the hair bundle and had a lower
concentration than in the pipette, this would cause the concentration
of endogenous buffer to be overestimated.
During a perforated-patch recording, there is no exchange of the larger
molecules between the cell and the electrode, although there is an
exchange of ions via the nystatin pores. Nevertheless, there were
significant drifts in the properties of the transducer current during
the first few minutes of a recording. In particular, the current grew
in amplitude, and the adaptation became faster. No measurements were
taken until the transducer responses had stabilized, the time course of
which was accelerated by exposing the hair bundle to
low-Ca2+ endolymph. One explanation for these
changes is that, before recording, the hair cells were depolarized and
Ca2+-loaded but were able to extrude the load after
exposure to low Ca2+ and voltage clamping at 90
mV, at which the voltage-gated Ca2+ channels are not
activated.
| |
RESULTS |
The endogenous buffer concentration in the hair bundle
Hair cell transducer currents were characterized by assaying two
separate parameters, the time constant of adaptation and the fraction
of total transducer current turned on at rest. The adaptation time
constant was obtained by fitting the decline in the current during a
sustained deflection of the hair bundle that evoked less than a
half-maximal response (Fig. 2).
Whole-cell measurements were made with intracellular solutions
containing 0.1, 1, or 10 mM concentrations of the calcium
buffer, BAPTA, in a range of external Ca2+
concentrations (0.07-2.8 mM). As reported previously
(Ricci and Fettiplace, 1997), both parameters of transduction depended
on the level of intracellular BAPTA (see Figs. 2, 3, 5). An increase in
BAPTA slowed the time course of adaptation and increased the fraction
of current activated at rest. The properties of adaptation also vary
with hair cell location (Ricci and Fettiplace, 1997) and it was
important, therefore, to characterize cells in defined cochlear
locations. Data were collected from hair cells at approximately one-third of the distance (d = 0.29 ± 0.05) and
two-thirds of the distance (d = 0.60 ± 0.06)
along the basilar papilla, where d is the distance of the
cell from the low-frequency end normalized to the total length of the
papilla. Based on the tonotopic organization of the turtle basilar
papilla (Crawford and Fettiplace, 1980; Wu and Fettiplace, 1996), these
two regions possess hair cells tuned to frequencies of ~90 and 200 Hz, respectively. As discussed later, the quantitative effects of the
buffer differed in the two locations.
View larger version (29K):
[in this window]
[in a new window]
|
Figure 2.
Transducer currents recorded in three
high-frequency hair cells under different intracellular
calcium-buffering conditions. A, Whole-cell electrodes
containing 0.1 mM BAPTA with perforated-patch recording for
the endogenous buffer (B) and with whole-cell
electrodes containing 1 mM BAPTA (C).
Currents (averages of 25 responses) to small positive and negative
bundle deflections are shown in external solutions containing 2.8 mM and 0.07 mM Ca2+. The
zero on the ordinate scale corresponds to the current level obtained
with a large negative stimulus in which the transducer conductance was
fully turned off. Recordings were characterized by measuring the time
constant of adaptation,  , and the fraction of total current
activated at rest before the stimulus. was obtained from single
exponential fits that are shown superimposed on the positive responses.
Note that the time constants of adaptation for the perforated-patch
recording fall between those for 0.1 and 1.0 mM BAPTA. The
timing and size of the stimulus, depicted above the currents, is the
same in all three cells. Maximum current amplitudes in 2.8 and 0.07 mM Ca2+, respectively were 1.2 and 2.0 nA (A), 0.65 and 1.1 nA
(B), and 0.66 and 1.2 nA
(C).
|
|
Transducer currents recorded with perforated-patch electrodes had
similar properties to those measured with whole-cell electrodes. In
particular, the currents were large with amplitudes up to 1 nA and
displayed fast adaptation during a maintained stimulus. The current
size depended on the position of the hair cell and had a maximum value
of 0.714 ± 0.07 nA (n = 7) at the low-frequency location and 1.10 ± 0.13 nA (n = 5) at the
high-frequency location in 70 µM external
Ca2+. This concentration is comparable to that in
turtle endolymph, the extracellular solution bathing the hair bundles
in vivo (65 µM; Crawford et al., 1991). Of
special note is the fact that 9 of the 12 cells recorded at both
cochlear locations retained adaptation in 70 µM external
Ca2+. In contrast, with intracellular BAPTA
concentrations >1 mM, adaptation often disappeared when
the external Ca2+ was reduced to <0.1
mM (Ricci and Fettiplace 1997). These results suggest that
the concentration of endogenous buffer is sufficiently low to support
adaptation in an external solution resembling endolymph.
Plots of the two transducer parameters, the adaptation time constant
and the fraction of current activated at the unperturbed position of
the hair bundle, are shown in Figure 3
for the different buffer conditions. An important observation is that
both parameters were similarly affected by BAPTA and by the endogenous
buffer. For the low-frequency location, the endogenous buffer is
equivalent to 0.1 mM BAPTA, using either the adaptation
time constant or the fraction of current turned on at rest as the assay
(Fig. 3A). At the high-frequency location, the measurements
for the endogenous buffer lie between those for 0.1 and 1.0 mM BAPTA (Fig. 3B). Interpolation of the values
at the different Ca2+ levels indicates that the
endogenous buffer is equivalent to 0.46 ± 0.10 mM
BAPTA based on the fraction of current turned on at rest and 0.33 ± 0.12 mM BAPTA based on the adaptation time constant.
Combining these values yields an effective buffer concentration of 0.4 mM BAPTA at the high frequency location, which is
significantly higher than in cells at the low-frequency location. These
results suggest that there may be a gradient in endogenous buffer along the cochlea.
View larger version (25K):
[in this window]
[in a new window]
|
Figure 3.
Estimates of the concentration of endogenous
calcium buffer in two cochlear locations. Plots of the fraction of
total current activated at rest [PO
(rest)] and the time constant of adaptation (ad)
as a function of the external Ca2+ concentration
bathing the hair bundle for low-frequency hair cells
(A) and high-frequency hair cells
(B). The cell location is denoted by
d, the fractional distance along the basilar membrane
from the low-frequency end. Each measurement is the mean ± 1 SEM
obtained from records similar to those in Figure 2 for whole-cell
recordings with 0.1 or 1 mM BAPTA (open
symbols) and with perforated-patch recordings
(filled symbols). Numbers of cells included in
perforated-patch, 0.1, and 1 mM BAPTA measurements,
respectively, were 7, 10, and 14 (low frequency) and 7, 7, and 23 (high frequency). Note the perforated-patch
results are comparable to 0.1 mM BAPTA at the low-frequency
location but fall between 0.1 and 1 mM BAPTA at the
high-frequency location.
|
|
In three experiments it was possible first to characterize the currents
with perforated-patch recording and then attain a whole-cell condition,
thus providing an internal control. As found in earlier experiments
(Tucker and Fettiplace, 1996) the whole-cell recordings remained stable
despite the leakage into the cell of the pore-forming nystatin. The
perforated patch gave consistent measurements for >30 min, and then
the patch was ruptured to attain a whole-cell recording. After waiting
a further 5 min for the electrode and cytoplasmic solutions to
equilibrate, allowing endogenous buffer to wash out, a new family of
transducer currents was taken. The transition from perforated-patch to
whole-cell produced little alteration in the peak current, a small
increase in the fraction of current activated at rest (0.033 ± 0.005 compared with 0.025 ± 0.003), and a slowing of the
adaptation time constant from 0.75 ±. 0.03 msec to 1.01 ± 0.13 msec. The changes are comparable to those obtained from the averaged
measurements in different cells and are consistent with the notion that
the buffering capacity of 1 mM BAPTA is greater than the
native buffer.
Relationship between adaptation time constant and transducer
current magnitude
The perforated-patch recordings, summarized in Table
1, provide some indication of the
physiological performance of the transducer at the two positions in the
cochlea. In an external Ca2+ concentration of 70 µM, the adaptation time constant was faster in cells
tuned to higher frequencies (1.4 ± 0.3 msec, n = 5) than in those tuned to low frequencies (2.5 ± 0.5 msec,
n = 4). Because a higher buffer concentration would
slow adaptation, the different concentrations of endogenous buffer in
cells at the two locations would, if anything, minimize the difference
in time constant. What other factors might be responsible for the
difference in adaptation kinetics? Cells at the high-frequency location
had a larger mean current than those at the low-frequency location (Table 1). To eliminate the contribution of the current magnitude, we
compared cells from the two locations that had similar sizes of
transducer current. Despite the overall differences in mean current,
there was substantial variation in maximal current at both positions,
presumably caused by a variable degree of mechanical damage to the
transduction apparatus during dissection. We could, thus, select
populations of cells having closely matched amplitudes of currents
obtained in 2.8 mM external Ca2+ and 1 mM internal BAPTA, for which the most extensive
measurements were available. Six low-frequency cells (fractional
distance along papilla, d = 0.17-0.28) had a mean
transducer current of 535 ± 44 pA and an adaptation time constant
of 1.41 ± 0.18 msec. By comparison, five high-frequency cells
(d = 0.55-0.75) had a virtually identical mean
transducer current of 530 ± 27 pA but a significantly faster
adaptation time constant of 0.94 ± 0.13 msec. Because hair bundles in high-frequency cells would have more stereocilia (Hackney et
al., 1993), the mean current per stereocilium would in fact be smaller
and yet generate faster adaptation.
As another approach to this question, a population of cells was
selected, also from measurements in 2.8 mM external
Ca2+ and 1 mM internal BAPTA, to span
the widest current range. This procedure required including some cells
that, because of their small current size, would normally not be used
to evaluate the average performance at a given position (see Materials
and Methods). For these populations, the adaptation time constant is
plotted in Figure 4 against the maximum
transducer current per stereocilium. The latter values were calculated
by normalizing the peak currents to the expected number of stereocilia
at the respective positions (Hackney et al., 1993): 60 stereocilia per
bundle at d = 0.22 and 90 stereocilia per bundle at
d = 0.64. Although for both cochlear locations there is
an inverse relationship between adaptation time constant and current
per stereocilium, the measurements at the two locations do not overlap
and, for a given current size, the time constant is faster in
high-frequency cells.
View larger version (27K):
[in this window]
[in a new window]
|
Figure 4.
Effects of transducer current amplitude on the
speed of adaptation. A, Transducer current families from
different high-frequency cells showing a faster time course of
adaptation in the cell with the larger current amplitude.
B, Collected results of the adaptation time constant
against maximum transducer current per stereocilium for the
low-frequency location (filled symbols) and the
high-frequency location (open symbols). The abscissa is
the maximum current amplitude scaled by the expected number of
stereocilia, 60 for the low-frequency location and 90 for the
high-frequency location. The mean cell location is given as the
fractional distance along the basilar membrane from the low-frequency
end. Cells were selected as originating from a narrow range of
positions and, to obtain a range of currents, some cells with the
smallest amplitudes were included but were not used in the other
analyses. All measurements correspond to 2.8 mM external
Ca2+ concentration and 1 mM BAPTA
internal buffer. The lines are least-squares fits with slopes and
regression coefficients of 0.086 and 0.92 (filled
symbols) and 0.052 and 0.87 (open symbols).
Note the plots for the two locations are separated and have different
slopes.
|
|
We do not fully understand the etiology of the relationship between
current magnitude and adaptation time constant in cells in which the
current was reduced, presumably because of loss of channels by damage
to the hair bundles (Ricci and Fettiplace, 1997). However, it is clear
from the results in Figure 4 that some aspect of the transducer
channels or their regulation must vary with hair cell location to
account for the difference in adaptation time constant at the different
cochlear locations. Two types of mechanism may be considered. The
fraction of transducer current carried by Ca2+ may
differ, implying a difference in transducer channel properties. Alternatively, a given rise in intracellular Ca2+
may be more efficacious because of differences in the
Ca2+-binding site or in the kinetics of the
adaptation process regulating channel opening. Both explanations imply
that the tonotopic frequency map in the turtle cochlea involves not
only a gradient in the properties of the voltage-dependent channels
that underlie electrical tuning (Wu et al., 1995), but also a variation
in the mechanoelectrical transduction apparatus.
Other calcium buffers
Another exogenous calcium buffer often used in patch recordings is
EGTA, which has a similar Ca2+ dissociation constant
to BAPTA but an ~150-fold slower rate of Ca2+
binding (Tsien, 1980; Naraghi and Neher, 1997). Recordings from high-frequency cells using patch solutions containing EGTA showed that
it was less effective in influencing transducer adaptation than BAPTA.
Thus, transducer currents in the presence of 10 mM intracellular EGTA retained fast adaptation, whereas with the same
concentration of BAPTA, the adaptation was substantially slowed (Fig.
5A). However, the fraction of
current activated at rest was sensitive to the EGTA. Collected results
(Fig. 5B) showed that 10 mM EGTA had a
comparable efficacy to 1 mM BAPTA in affecting the fraction
of current activated at rest but was equivalent to no more than 0.1 mM BAPTA in altering the time constant of adaptation. Thus,
when expressed in terms of an equivalent BAPTA concentration, EGTA had
a differential effect on the two transducer parameters. When the EGTA
concentration was reduced to 1 mM EGTA, the fraction of
current activated at rest was equivalent to 0.1 mM BAPTA,
but the adaptation time constant was not further accelerated and had a
value similar to 10 mM EGTA or 0.1 mM BAPTA.
Thus, the time constant became independent of the calcium buffer. One
reason for this may be that with low buffering the time course of the Ca2+ transient is no longer the rate-limiting step
in adaptation, which is now constrained by subsequent kinetic
processes. With use of exogenous buffers like BAPTA and EGTA, it is
generally assumed that they exert no effect distinct from their
Ca2+-binding action. The overall similarity in
behavior of the transducer currents obtained with perforated-patch
recordings compared with those with whole-cell recording with exogenous
buffers supports this assumption. Furthermore, the peak current
amplitudes were similar with different buffers. For example, maximal
transducer currents in 2.8 mM Ca2+ were
1030 ± 107 pA, n = 7 (0.1 mM BAPTA);
942 ± 88 pA, n = 7 (10 mM BAPTA); and
1116 ± 108 pA, n = 10 (10 mM
EGTA).
View larger version (30K):
[in this window]
[in a new window]
|
Figure 5.
Comparison of the effects of EGTA and BAPTA on
transducer adaptation. A, Families of transducer
currents recorded with 10 mM EGTA and with 10 mM BAPTA in 2.8 mM external
Ca2+. Note that adaptation is faster with EGTA.
B, Collected measurements of the fraction of total
current activated at rest, PO (rest) and the
time constant of adaptation, ad, as a function of
the external Ca2+ concentration for recordings with
BAPTA (open symbols, continuous lines)
and EGTA (filled symbols, dashed
lines). Note that EGTA is equivalent to a 10-fold smaller BAPTA
concentration in affecting the fraction of current activated at rest
but is equivalent to a 100-fold lower BAPTA concentration in altering
the adaptation time constant. Results on ten cells are presented, only
one-sided SE bars being shown for clarity. Error bars for the BAPTA
points are given in Figure 3.
|
|
For comparison with the endogenous buffer, three other buffers with
higher Ca2+ dissociation constants
(KCa) were tested, dibromo-BAPTA
(KCa = 2 µM; Tsien, 1980),
nitro-BAPTA (KCa = 40 µM; Pethig
et al., 1989), and tetrafluoro-BAPTA (KCa = 65 µM at 37°C; London et al., 1994). (The presence of
Mg2+ in the intracellular medium may alter somewhat
the values of these dissociation constants; Pethig et al., 1989.) The
clearest set of data were obtained with nitro-BAPTA, which had a more
pronounced effect on the adaptation time constant than on the fraction
of current activated at rest (Fig. 6).
The nitro-BAPTA was added to the internal solution at a concentration
of 0.9 mM mixed with 0.1 mM BAPTA, the small
amount of BAPTA being needed because the cells deteriorated rapidly
with only a low-affinity calcium buffer. The buffer combination had
effects comparable to 0.1 mM BAPTA alone on the fraction of
current activated at rest but was at least as effective as 1 mM BAPTA in slowing the adaptation time constant. Results
similar in direction but less extreme in magnitude were observed with
dibromo-BAPTA, which was less effective than an equivalent
concentration of BAPTA in reducing the fraction of current activated at
rest but slightly more effective in decreasing the adaptation rate
(results not shown). In nine experiments, dibromo-BAPTA was found to be
equivalent to approximately one-third the equivalent BAPTA
concentration in affecting the fraction of current activated at
rest.
View larger version (24K):
[in this window]
[in a new window]
|
Figure 6.
The effects on transducer adaptation of a
low-affinity Ca2+ buffer, nitro-BAPTA, compared with
BAPTA. A, Families of transducer currents recorded with
1 mM BAPTA or with 0.9 mM nitro-BAPTA plus 0.1 mM BAPTA in 0.07 mM external
Ca2+. Note that although adaptation is slow under
both conditions, a larger fraction of current is turned on at rest with
the 1 mM BAPTA. B, Collected measurements of
the fraction of total current activated at rest,
PO (rest), and the time constant of
adaptation, ad, as a function of the external
Ca2+ concentration for recordings with BAPTA
(open symbols, continuous lines) and 0.9 mM nitro-BAPTA plus 0.1 mM BAPTA
(filled symbols, dashed lines; 6 cells). Note that nitro-BAPTA is equivalent to a 10-fold smaller BAPTA
concentration in affecting the fraction of current activated at rest
but is at least as effective as BAPTA in altering the adaptation time
constant. Measurements on six cells are included for nitro-BAPTA. Error
bars for BAPTA results are shown in Figure 3.
|
|
The most striking behavior was seen with the lowest affinity buffer,
tetrafluoro-BAPTA, which in 70 µM external
Ca2+ completely abolished fast transducer adaptation
without altering the fraction of current turned on at rest (Fig.
7). As with the nitro-BAPTA, it was
necessary to add some high-affinity buffer, here 1 mM EGTA,
to prevent rapid deterioration caused by Ca2+
loading. However, the effects illustrated were never seen with EGTA
alone (Fig. 5). The importance of this result with tetrafluoro-BAPTA is
that it demonstrates a dissociation of the two aspects of adaptation and thus, resembles the effects of treatment with calmodulin
antagonists (Walker and Hudspeth, 1996). Although we have analyzed
transducer adaptation in terms of the two parameters, the adaptation
time constant and fraction of current activated at rest, we cannot rule
out that other Ca2+-dependent processes are
involved. For example, the sluggish current offsets with 0.07 mM external Ca2+ in Figure 7 are not
accounted for by the present scheme. These offsets, reflecting a slow
rate of channel closure, have been previously seen under conditions of
reduced Ca2+ entry or high intracellular calcium
buffer (Crawford et al., 1989).
View larger version (17K):
[in this window]
[in a new window]
|
Figure 7.
Families of transducer currents recorded with
whole-cell patch electrodes containing 3 mM
tetrafluoro-BAPTA plus 1 mM EGTA as the
Ca2+ buffer. Each trace is the average of 5-25
responses. Note that in 2.8 mM external
Ca2+, the cell showed fast adaptation, which was
completely abolished in 0.07 mM external
Ca2+ with no increase in the fraction of current
turned on at rest. This behavior was not seen with 1 mM
EGTA alone (Fig. 5). Similar results were obtained in two other
cells.
|
|
The slow calcium buffer EGTA and the low-affinity buffers nitro-BAPTA,
dibromo-BAPTA, and tetrafluoro-BAPTA all had a differential effect on
the transducer parameters assayed when compared with BAPTA. This is in
contrast to the behavior of the endogenous calcium buffer, which was
equivalent to the same concentration of BAPTA in affecting both
parameters (Fig. 3). A conclusion from these results is that the
endogenous buffer must have a faster Ca2+-binding
rate than EGTA and a higher affinity than any of the substituted BAPTA
derivatives.
Ca2+ feedback and tuning of the
transducer current
To characterize adaptation, we have used the time course of
relaxation of the transducer current during a sustained mechanical stimulus to the hair bundle. For most cells, this relaxation could be
described by a single time constant. However, in a minority of
recordings, the decline in the current exhibited damped oscillations (Fig. 8). Such oscillatory behavior is
unlikely to be an artifact for a variety of reasons. First, the
amplitude of the oscillations could be much larger than any inherent
noise-induced vibrations of the stimulating probe. For example, in
Figure 8A the photodiode monitor of the motion of the
probe showed no hint of noise or oscillations of amplitude comparable
to the relative size of the oscillations in the current response.
Second, the frequency of the damped oscillations was different in
different cells. In 11 cells in which oscillations were visible, their
frequency ranged from 58 to 230 Hz (Fig.
9). Thirdly, their appearance was related to the Ca2+ balance of the cells. In Figure 8, the
oscillations become apparent when the external Ca2+
was reduced from 2.8 mM to 70 µM. In the cell
of Figure 8B, the maximum amplitude of the transducer
current was virtually identical in 350 and 70 µM external
Ca2+, but the oscillations were much more obvious in
the lower Ca2+ concentration. If the oscillations
were manifestations of vibration in the stimulating probe, they should
have had a similar size in both Ca2+ concentrations
for which the maximum current amplitude and transducer sensitivity was
comparable. When oscillations were evident at more than one
Ca2+ concentration, their frequency was increased on
average by 36% (n = 3) in the higher
Ca2+ (0.35 or 1 mM) relative to 70 µM. Finally, the oscillations are unlikely to result from
any activation of the basolateral membrane conductances because the
cells were voltage-clamped at 90 mV at which the voltage-dependent
conductances would be completely turned off (Art and Fettiplace,
1987).
View larger version (24K):
[in this window]
[in a new window]
|
Figure 8.
Damped oscillations in the transducer current
response. A, Perforated-patch recording for a hair cell
at the high-frequency location. When the external
Ca2+ concentration was reduced from 2.8 to 0.07 mM, there was an augmentation in response amplitude and the
appearance of damped oscillations for the positive steps. The time
course of motion of the stimulating probe, measured with a dual
photodiode detector, is given at the top and shows no hint of
oscillations in the stimulus. Oscillation frequency, 82 Hz; maximum
current amplitude, 0.6 nA. B, Whole-cell recording with
an intracellular solution buffered with 1 mM EGTA. As in
A, the damped oscillations are most prominent in the
lowest external Ca2+ concentration. Oscillation
frequencies at stimulus onset, 92 Hz (0.35 mM
Ca2+) and 77 Hz (0.07 mM
Ca2+); maximum current amplitude, 1.63 nA. Each
record in both A and B is the average of
25 responses.
|
|
View larger version (22K):
[in this window]
[in a new window]
|
Figure 9.
Damped oscillations in transducer currents
illustrating the range of frequency tuning in different hair cells.
Averaged currents in four cells are shown for small, ±50 nm or ±100
nm, bundle displacements of duration 50 msec (left) or
20 msec (right). The timing of the stimulus is displayed
above the responses, the time axis being different on the left and
right. The resonant frequencies, FO,
inferred from the oscillatory period for the onset of the response to
positive stimuli, are denoted beside the records. The sharpness of
tuning was estimated from the quality factor (Q3dB)
calculated from Q3dB = ( FO
O), where O is the time constant
of decay of the oscillations. The resonant frequency and
Q3dB and the concentration of external
Ca2+ and intracellular calcium buffer for the four
cells were: 61 Hz, 2.8, 0.07 mM Ca2+, 3 mM F4-BAPTA + 1 mM EGTA; 116 Hz,
2.1, 0.35 mM Ca2+, 1 mM
EGTA; 129 Hz, 2.8, 0.35 mM Ca2+, 3 mM BAPTA; 230 Hz, 2.3, 2.8 mM
Ca2+, 1 mM BAPTA.
|
|
Such oscillatory recordings were difficult to study systematically
because they were prominent in only a minority of recordings, usually
in cells with the largest maximum responses. Nevertheless, they are
important in the present context because they may reflect the true
physiological performance of transduction. If this were the case they
could contribute to the frequency selectivity of the hair cell and
should, thus, occur at a frequency appropriate for the location of the
cell. The oscillations were most conspicuous in circumstances
resembling those in vivo, with 70 µM external Ca2+ and with a low concentration of internal
calcium buffer. Under such conditions, with 0.1 mM BAPTA or
1 mM EGTA as the buffer, the mean oscillation frequency was
115 ± 30 Hz at a mean cochlear location of 0.54 (n = 5). A similar oscillation frequency of 106 Hz was
obtained in perforated patch-patch recordings (Fig.
8B) from two cells at a cochlear location of 0.54. Based on the tonotopic organization of the turtle cochlea, the resonant
frequency corresponding to this cochlear location is 170 Hz.
The damped oscillatory transducer currents are most likely related to
the fast adaptation mechanism. Both processes are
Ca2+-sensitive and have a comparable frequency
range. Thus, in perforated-patch recordings the adaptation time
constant, ad, of 1.4 msec (Table 1) is equivalent
to a half-power frequency (= 1/2ad) of 114 Hz,
similar to the mean oscillation frequency of 106 Hz. A relationship between the damped oscillatory transducer currents and adaptation may
be inferred by considering that adaptation reflects a negative feedback
control of the transducer channels. Ca2+ entering
through open channels triggers an intracellular process that acts to
close the channels and hence reduce Ca2+ influx.
Such negative feedback may be overdamped, where the response output
decays exponentially with time to a steady level. It may be slightly
underdamped and cause the decaying response to undershoot the steady
level. However, it can also be very underdamped, in which case, the
response settles with an oscillatory time course. All three types of
response were observed experimentally, although the first two were most
common. The underdamped oscillatory behavior is a manifestation of
resonance that can produce frequency tuning for sinusoidal stimuli with
the magnitude of the transducer current being maximal at the resonant
frequency. The sharpness of tuning endowed by the resonance can be
assessed from the quality factor or Q3dB value (Crawford
and Fettiplace, 1981a,b) which was 2-3 for the cells in Figure
9. If such resonance behavior proves to be a physiologically
significant feature of transduction, then the speed of adaptation
assumes importance in determining the resonant frequency. The variation
in the adaptation time constant with cochlear location suggests that,
in those hair cells displaying resonance in the transducer current,
there might also be a variation in resonant frequency along the
cochlea.
A model for the Ca2+ gradient along
the stereocilia
The fraction of current turned on at rest reflects the position of
the transducer activation curve and is also subject to Ca2+ feedback. As the transducer channels open
during a positive stimulus, letting in more Ca2+,
the activation curve is shifted to larger bundle displacements, thus
reducing the Ca2+ entry at rest (Assad et al., 1989;
Crawford et al., 1989). Conversely, as the external
Ca2+ is reduced, the activation curve shifts to
smaller displacements so the fraction of current turned on at rest
increases. The resting open probability of the transducer channels thus
adjusts the entry of Ca2+ to stabilize its
concentration at an internal site (Ricci and Fettiplace, 1998). Why
then should the fraction of current turned on at rest depend on the
concentration of calcium buffer? One explanation is that there is a
gradient in Ca2+ from its source, the transducer
channel, to its site of action, and the steepness of the gradient
depends on the buffer concentration (Neher, 1986; Stern, 1992; Naraghi
and Neher, 1997). Ca2+ gradients along the
stereocilia have been measured experimentally with confocal
Ca2+ imaging (Denk et al., 1995; Lumpkin and
Hudspeth, 1995), but the major portion of the gradient is likely to
exist within the first 100 nm from the channel, a distance below the
resolution of current light microscopy. As an alternative, we have
chosen to calculate the steady-state diffusional gradient based on
assumptions about buffer properties and Ca2+ entry
and extrusion processes.
The approach was identical to that described in Wu et al. (1996), the
details of which are given in the . A three-dimensional model
of the stereocilium was compartmentalized in cylindrical coordinates.
The major components and features of the model were as follows: (1) the
transducer channels were represented as a diffuse
Ca2+ source, 10 nm radius, located at the tip of the
stereocilium (Jaramillo and Hudspeth, 1992). Additional channels placed
on the side-wall of the stereocilium (Denk et al., 1995) were neglected as a first approximation because of the added complexity needed for the
model. (2) The Ca2+ influx through the transducer
channels was derived from the current activated at rest (Figs. 3, 5)
multiplied by the fraction of the current carried by
Ca2+ in different external concentrations (Ricci and
Fettiplace, 1998). Because the latter Ca2+
permeability data were obtained for a high-frequency location, the
simulation was confined to hair cells at this location. (3) Ca2+ was extruded via plasma membrane CaATPase pumps
(Crouch and Schulte, 1995; Tucker and Fettiplace 1995) at a density of
2000/µm2, a value similar to that deduced
experimentally (Wu et al., 1996; Ricci and Fettiplace, 1998; Yamoah et
al., 1998). (4) The components of the intracellular calcium buffering
included three concentrations of BAPTA (0.1, 1, and 10 mM)
and 1 mM free ATP which buffers Ca2+
close to the channel (Naraghi and Neher, 1997). If the buffering properties of ATP were not included, the Ca2+
attained a higher concentration close to the membrane, but the form of
the Ca2+ profiles described below were not
substantially altered. Table 2 lists
values for buffer-binding constants and diffusion coefficients.
Figure 10A gives
results of the calculations illustrating the
Ca2+ profile in a slice through the center of
the stereociliary cylinder. Surrounding the apically placed channel is
a cloud of high Ca2+, the concentration and spatial
extent of which depend on the amount of BAPTA present. The gradient is
shallower and the Ca2+ levels lower the smaller the
BAPTA concentration. The Ca2+ profiles are plotted
in Figure 10B along the cylinder axis, which, at the
stereociliary tip, intersects the transducer channel complex. The
Ca2+ concentration near the channel increases with
buffer concentration because of the fact that a greater fraction of
current is turned on at rest (Fig. 3), but the Ca2+
declines more steeply the higher the buffer concentration. As a
consequence, the profiles in the different buffers cross at a distance
of 15-35 nm from the source and at an internal Ca2+
concentration of 10-20 µM. The coordinates of the
crossing point were comparable in the two external
Ca2+ concentrations (Fig. 10B).
The form of the profiles and the location of the crossing point were
not significantly affected by a 10-fold increase in the density of
CaATPase pumps or by a fivefold reduction in the buffer diffusion
coefficients (data not shown).
View larger version (30K):
[in this window]
[in a new window]
|
Figure 10.
Steady-state Ca2+ profiles in
a hair cell stereocilium predicted from a three-dimensional diffusion
model. A, Vertical section through the center of a
cylindrical stereocilium, diameter 0.4 µm, with a
Ca2+ source, the transducer channels, placed at the
distal tip. Pseudocolor images of the Ca2+
concentration profiles are shown for three different intracellular
BAPTA concentrations. The Ca2+ entry was calculated
from experimental data of the standing transducer current and the
channel permeability in 0.07 mM external
Ca2+. Note the Ca2+ gradient is
steepest for the highest buffer concentration. B,
Ca2+ profiles down the axis of the cylindrical
stereocilium, length 6 µm, for the three BAPTA concentrations in 2.8 mM external Ca2+ (top)
and 0.07 mM external Ca2+
(bottom). Note that the curves for the different buffers
cross at a distance of 20-40 nm from the source.
|
|
To appreciate the significance of the crossing point, suppose that the
BAPTA concentration in an unstimulated hair cell was rapidly raised
from 0.1 to 10 mM. The Ca2+ gradient
with distance from the channel would initially become steeper and, with
no change in the channel open probability, there would be a substantial
drop in Ca2+ concentration at the internal site
controlling adaptation. Ca2+ would dissociate from
its binding site and promote a change in the adaptive feedback that
would cause a leftward-shift in the transducer activation curve and an
increase in the resting open probability of the transducer channels. As
a consequence, the influx of Ca2+ would increase so
as to restore its concentration at the control site. Because for small
stimuli, adaptation is close to complete, at least in 2.8 mM external Ca2+ (Fig. 2; Ricci and
Fettiplace, 1997), the crossing point may represent the locus of the
Ca2+-binding site. However, in view of the
assumptions involved in the calculation and the possibility that the
binding sites are spatially distributed, we do not wish to place too
much emphasis on the absolute coordinates. Nevertheless, the
intersection of the Ca2+ profiles in different
calcium buffers is consistent with intracellular Ca2+-mediating feedback regulation of the transducer
channels. Furthermore, a change in the steepness of the
Ca2+ profile in different buffer concentrations
provides a rational explanation for the effect of the buffer on the
position of the transducer activation curve.
Equivalent calbindin concentration
The level of endogenous buffer ascertained from the
perforated-patch recordings has been expressed in terms of an effective concentration of BAPTA. The endogenous buffer is probably a protein like calbindin or parvalbumin with a smaller diffusion coefficient and
different Ca2+-binding properties than BAPTA. We
used the Ca2+ diffusion model to estimate the
concentration of calbindin 28k that would produce the same
Ca2+ profile as BAPTA. A fixed
Ca2+ entry, corresponding to that in
perforated-patch recordings in 2.8 mM external
Ca2+, was assumed, and Ca2+
profiles in a series of BAPTA concentrations were matched to those in
different calbindin concentrations. Calbindin was assumed to have a
fourfold smaller diffusion coefficient than BAPTA, approximated from
the cube root of the ratio of molecular weights. This gives a diffusion
coefficient of 50 µm2
sec 1, which is comparable to the value of
75 µm2 sec1 estimated for the
endogenous buffer in saccular hair cells by Hall et al. (1997). Because
the Ca2+-binding parameters for calbindin 28k are
not well established, values for calbindin 9k were assumed (Martin et
al., 1990): a Ca2+ dissociation constant of 0.5 µM and a forward rate constant of 20 µM1 sec1. As shown in
Figure 11, over most of the
Ca2+ range, a given BAPTA concentration could be
reasonably matched with an ~20-fold larger calbindin concentration.
The match deteriorated at low Ca2+ concentrations
for distances >100 nm from the channel. Thus, the range of BAPTA
concentrations equivalent to the native buffer (0.1-0.4
mM) would correspond to 2-8 mM calbindin
Ca2+-binding sites, or 0.5-2 mM
calbindin, assuming four Ca2+-binding sites per
molecule (Bredderman and Wasserman, 1974). A similarly high
concentration of calbindin 28k, ~1 mM, has been found in
the chick basilar papilla (Oberholtzer et al., 1988) and has been
estimated for frog saccular hair cells (Roberts, 1994).
View larger version (17K):
[in this window]
[in a new window]
|
Figure 11.
Relative Ca2+ profiles in the
stereocilium for different concentrations of BAPTA and calbindin 28k. A
fixed Ca2+ entry, corresponding to the standing
current in perforated-patch recordings in 2.8 mM external
Ca2+ was assumed in all calculations, and the
concentrations of calbindin-yielding profiles (dashed
lines) that matched the profiles for a range of BAPTA
concentration (continuous lines) were determined. The
match was optimized for a Ca2+ concentration range
from 1 to 20 µM. B, Plot of the calbindin
concentrations producing equivalent profiles to those of 0.05, 0.1, 0.2, 0.5, and 1.0 mM BAPTA. Slope of line = 20.8.
|
|
| |
DISCUSSION |
The concentration of endogenous diffusible buffer
The main aim of the work was to estimate the concentration of the
diffusible calcium buffer of the hair cell, which was found to have
effects similar to 0.1 mM BAPTA in low-frequency hair cells
and 0.4 mM BAPTA in high-frequency cells. Because the
properties of the mechanoelectrical transducer current were used to
assay the efficacy of the buffer, the concentration measured will
largely reflect that in the hair bundle where the transducer channels are localized (Hudspeth, 1982; Jaramillo and Hudspeth, 1992). The
buffer concentrations are less than the 1 mM BAPTA
determined for turtle hair cells from a midcochlear region using
measurements of Ca2+-activated K+
channels found in the cell body (Tucker and Fettiplace, 1996).
Hair cells of both the mammalian cochlea (Pack and Slepecky, 1995) and
the bullfrog vestibular organs (Shepherd et al., 1989; Baird et al.,
1997) contain various calcium-binding proteins revealed with
immunohistological methods. Some such proteins, calbindin, calretinin,
or parvalbumin, display both a differential localization within the
cell and a regional gradient across the organ. It is not difficult to
imagine that if distinct types of buffer exist in the hair bundle and
cell body, they may have different Ca2+-binding
rates and dissociation constants and, thus, a differential efficacy
relative to BAPTA. In the mammalian cochlea, there is a regional
gradient in calbindin, with the highest concentration in apical
low-frequency hair cells (Pack and Slepecky, 1995). The opposite
distribution is suggested in the chick cochlea, in which the calbindin
28k transcript is more concentrated in the basal high-frequency half
(Navaratnam et al., 1995). The latter observation accords with the
functional gradients of calcium buffering inferred from the present
results in the turtle.
The time course of transducer adaptation
A second experimental aim was to document the properties of
transduction in different regions and, by using perforated-patch recordings, to obtain evidence about the transducer gradients that may
exist in the intact cochlea. The values given (Table 1) were measured
in an external solution containing 70 µM
Ca2+ similar to the concentration in turtle
endolymph that bathes the hair bundles in vivo (Crawford et
al., 1991). The maximum amplitude of the transducer current was 60%
larger, and the time constant of adaptation, ad,
was faster at the high-frequency position. The differences in
ad, 1.4 msec at the high-frequency location and
2.5 msec at the low-frequency location, suggest that adaptation
contributes a high-pass filter to the frequency-tuning curve of the
hair cell. The two mean values of ad correspond to
corner frequencies (= 1/2 · ad) of 114 and
64 Hz, which are ~0.65 of the characteristic frequency of the cell,
90 and 200 Hz at the two cochlear locations.
The observation that, in some cells, the transducer current displayed
resonance-like behavior at a frequency comparable to the characteristic
frequency of the cell, reinforces the notion that adaptation will
contribute to the frequency selectivity of the hair cell. Thus, the
frequency tuning of turtle auditory hair cells is determined both by
filtering imposed by the mechanoelectrical transduction process and by
the electrical resonance caused by voltage-dependent conductances in
the basolateral membrane (Fettiplace and Crawford, 1978; Crawford and
Fettiplace, 1981b). The present experiments did not examine whether
there was any mechanical correlate of the oscillatory transducer
currents. Damped oscillations in bundle motion at frequencies of
20-320 Hz have previously been seen in turtle cochlear hair cells
(Crawford and Fettiplace, 1985), and fast
Ca2+-dependent oscillations at frequencies of ~100
Hz have recently been reported in frog saccular hair bundles (Benser et
al., 1996). It is possible that such bundle movements reflect
mechanical changes that could underlie the transducer current
oscillations reported here.
There were two anomalies in the perforated-patch recordings executed in
70 µM external Ca2+. First, the
fraction of transducer current activated at rest at both cochlear
locations was 28%, somewhat larger than the 10-15% estimated in the
intact organ (Crawford and Fettiplace, 1981a). Second, in some of the
low-frequency cells, transducer adaptation was abolished in low
external Ca2+. Several experimental factors that
would each reduce the Ca2+ influx may account for
these anomalies. First, the maximum amplitude of the transducer
currents may have been smaller than those in vivo, because
of damage to the transduction apparatus during dissection. Second, the
external solution, unlike endolymph, did not contain K+ as the major monovalent cation; the presence of
high K+ has been shown to augment the fraction of
Ca2+ carried by the transducer current (Ricci and
Fettiplace, 1998). Third, it has been estimated for the frog saccular
hair cells that Ca2+ extrusion from the hair bundle
may raise the local Ca2+ concentration above that in
the bulk endolymph (Yamoah et al., 1998). The calculation was based on
Ca2+ entry through voltage-sensitive
Ca2+ channels in the basolateral membrane and
ignored the contribution of CaATPases in the cell soma. Nevertheless,
it is conceivable that the Ca2+ concentration around
the hair bundle may be somewhat higher than the 70 µM
used here to assess the physiological performance of transduction.
Correction for these disparate experimental factors may bring the
fraction of transducer current turned on at rest into line with the
values in the intact cochlea. It would also shorten the adaptation time
constants, thus making the corner frequencies calculated above nearer
to the characteristic frequency of the cell.
One or two Ca2+-binding sites?
Our results both on the transducer current oscillations and the
Ca2+ profiles in the presence of different buffers,
support the notion of a calcium-feedback regulation of the transducer
channel (Ricci and Fettiplace, 1998). Two experimental manifestations
of this regulation are the Ca2+ dependence of the
adaptation time constant (ad) and of the fraction of transducer current activated at rest
(PO). Both parameters are sensitive to
intracellular calcium buffering. An increase in buffer concentration
will slow ad by reducing the rate of change of
intracellular Ca2+. It will also alter
PO by steepening the steady-state
Ca2+ gradient in the stereocilium (Fig. 10); the
more abrupt the decline in Ca2+ with distance from
the channel, the higher the Ca2+ entry, and hence
PO, must be to keep the
Ca2+ level constant at the regulation site.
Surprisingly, PO and ad were
differentially sensitive to other calcium buffers compared with BAPTA.
EGTA had a stronger influence on PO,
whereas the low-affinity buffer, nitro-BAPTA, was more effective in
slowing ad.
According to a recent analysis (Naraghi and Neher, 1997), a buffer can
be assigned a characteristic length-constant of action determined by:
(1) its mobility, which will be similar for all the BAPTA-type buffers
considered; (2) its buffering power, which is related to its
concentration and KCa; and (3) its mean
time to capture a Ca2+ ion, given by
(k+[B])1, where
k+ is the forward rate constant of the buffer
and [B] its concentration. EGTA, with a
k+ 150-fold smaller than BAPTA, should be a less
efficient Ca2+ buffer close to the source. EGTA was
at least 100 times less effective, on a concentration basis, than BAPTA
in affecting ad, but was only 10-fold worse in
influencing PO (Fig. 5). In contrast, nitro-BAPTA, with a 200-fold lower affinity, and hence lower buffering power, will have a shorter length-constant than BAPTA. Nitro-BAPTA was
equal to BAPTA in altering ad, but about fourfold
less effective in altering PO (Fig. 6). These
combined observations suggest that the Ca2+-binding
site for controlling PO lies further from the
transducer channel than the site for regulating ad. Both
sites are susceptible to 1 mM BAPTA and must, therefore, be
within 100 nm of the channel.
An explanation for the results is that adaptation is controlled by at
least two Ca2+-binding sites. Although both sites
may contribute to both transducer parameters, the differential actions
of the buffers reflect the relative strengths of the sites in
modulating PO and ad. Thus, nitro-BAPTA will predominantly affect ad at a site close
to the channel, whereas EGTA will mainly influence
PO at a more distant site. Some support for this
hypothesis is derived from other experimental manipulations that
preferentially affect one or other property of adaptation. Calmodulin
antagonists abolished fast transducer adaptation with no effect on
PO (Walker and Hudspeth, 1996) and produced
responses resembling those in Figure 7. In contrast, large shifts in
the current-displacement relation with no effect on ad
were seen after treatment with phosphate analogs like vanadate (Yamoah
and Gillespie, 1996) and with 8-bromo-cAMP (Ricci and Fettiplace,
1997). Whatever the mode of action of these various agents, their
effects endorse the notion implied by the calcium buffer results that
the two transducer parameters, PO and
ad, can be manipulated independently.
| |
FOOTNOTES |
Received May 29, 1998; revised July 22, 1998; accepted July 24, 1998.
This work was supported by a National Institutes of Health Grant 5RO1
DC 01362 to R.F. from the National Institutes on Deafness and other
Communicative Disorders. We thank Mark Gray-Keller for helpful
comments.
Correspondence should be addressed to Robert Fettiplace, 185, Medical
Sciences Building, 1300 University Avenue, Madison, WI 53706. Dr. Wu's
present address: SAP Labs, 3475 Deer Creek Road, Palo Alto, CA 94304.
| |
APPENDIX |
The stereocilium, radius (a) = 0.2 µm and length
(L) = 6 µm, was represented by a three-dimensional
model compartmentalized in cylindrical coordinates (r,  ,
z). Ca2+ enters through transducer
channels located in the center of the top of the stereocilium, and
fixed and diffusible buffers are initially distributed uniformly within
the cytoplasmic space. Diffusion throughout the cytoplasm can be
described in cylindrical coordinates as follows:
|
(A1)
|
with u the concentration of free
Ca2+ ions, Ca2+-bound or
Ca2+-free diffusible buffer, and
Du the diffusion coefficient of the substance
U.
Ca2+ fluxes
The averaged Ca2+ current per stereocilium is
obtained from:
|
(A2)
|
where IMT is the maximal transducer current
(taken from mean experimental values), iMT is
the maximal transducer current per stereocilium, pCa is the
Ca2+ permeability, and ns is
the total number of stereocilia (ns = 90).
Calculations were performed for two external Ca2+
concentrations in which the values of
IMT, iMT,
and pCa were: 2.8 mM
Ca2+, 700 pA, 7.8 pA, 0.58; 0.07 mM
Ca2+, 1075 pA, 11.9 pA, 0.17 (Ricci and Fettiplace,
1998).
The rate of change of free Ca2+ concentration caused
by the opening or closing of transducer channels is defined as:
![<FENCE><FR><NU>∂[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>influx</UP></SUB>=<FR><NU><UP>−</UP><A><AC>i</AC><AC>&cjs1171;</AC></A><SUB><UP>Ca</UP></SUB> · p<SUB><UP>O</UP><SUB><UP>m</UP></SUB></SUB></NU><DE>2 · F · &pgr; · r<SUB><UP>a</UP></SUB></DE></FR>,](/content/vol18/issue20/fulltext/8261/img003.gif)
|
(A3)
|
where IMT is the maximal
Ca2+ current per stereocilium as defined in Equation A2, F is Faraday's constant,
pom is the open probability of the
transducer estimated from experimental data, and
ra is the radius of the area over which
Ca2+ ions enter (10 nm). Ca2+ is
extruded by CaATPase pumps that are uniformly distributed in the hair
bundle membrane and bind Ca2+ with a dissociation
constant Km = 0.5 µM (Garrahan and
Rega, 1990). An inward Ca2+ leakage maintains the
steady state at the stereociliary base (Sala and Hernández-Cruz,
1990). The combination of Ca2+ extrusion and leakage
then can be defined as:
![<FENCE><FR><NU>∂[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>ext</UP></SUB>=<FR><NU>&ngr;<SUB><UP>max</UP></SUB> · A(r, z)</NU><DE>V<SUB><UP>c</UP></SUB></DE></FR> · <FENCE><FR><NU>[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]<SUB><UP>o</UP></SUB></NU><DE>[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]<SUB><UP>o</UP></SUB>+K<SUB><UP>m</UP></SUB></DE></FR>−<FR><NU>[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]</NU><DE>[<UP>Ca</UP><SUP><UP>2+</UP></SUP>]+K<SUB><UP>m</UP></SUB></DE></FR></FENCE>](/content/vol18/issue20/fulltext/8261/img004.gif)
|
(A4)
|
where [Ca2+]o = 0.1 µM is the initial steady-state concentration,
 max = 3.32 × 104
µmoles · m2 · msec1
(based on 100 ions · sec1 · pump1
and 2000 pumps · µm2) is the maximal
velocity of transport, and A(r, z) is
the effective pumping area of a compartment (r,
z).
Calcium buffers
Fixed buffers will not contribute to the steady-state
Ca2+ gradients (Naraghi and Neher, 1997), so only
mobile buffers are considered. Ca2+ binding is
assumed to have second order kinetics:
|
(A5)
|
where BD and CaBD
are the Ca2+-free and Ca2+-bound
diffusible buffers, and k+D and
kD are the binding and unbinding rate
constants. The dissociation constant kdD is
equal to kD/k+D. Diffusion
coefficients of Ca2+-free and
Ca2+-bound diffusible buffers are assumed to be
identical. If the BD and
CaBD are treated as a single species, the net
exchange of [BD] and
[CaBD] between one compartment and its
surrounding compartments becomes zero; i.e., the total buffer
concentration remains fixed, and thus the spatial distribution of total
buffer is unaffected by [Ca2+] (Neher, 1986;
Roberts, 1994). Then, the rate of change of free [Ca2+] produced by the diffusible buffer can be
defined as:
![<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>mobile</UP></SUB>=k<SUP><UP>d</UP></SUP><SUB><UP>D</UP></SUB> · k<SUP><UP>+</UP></SUP><SUB><UP>D</UP></SUB> · ([B<SUP><UP>T</UP></SUP><SUB><UP>D</UP></SUB>]−[B<SUB><UP>D</UP></SUB>])−k<SUP><UP>+</UP></SUP><SUB><UP>D</UP></SUB> · [<UP>Ca<SUP>2+</SUP></UP>] · [B<SUB><UP>D</UP></SUB>],](/content/vol18/issue20/fulltext/8261/img006.gif)
|
(A6)
|
with [BTD] the total concentration of
BD. The rate of changes of
Ca2+-free and Ca2+-bound buffers
can also be related to Equation A6:
![<FENCE><FR><NU>∂[B<SUB><UP>D</UP></SUB>]</NU><DE>∂t</DE></FR></FENCE>=<UP>−</UP><FENCE><FR><NU>∂[<UP>Ca</UP>B<SUB><UP>D</UP></SUB>]</NU><DE>∂t</DE></FR></FENCE>=<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>mobile</UP></SUB>+D<SUB><UP>B</UP></SUB> · ∇<SUP>2</SUP>[B<SUB><UP>D</UP></SUB>]=0,](/content/vol18/issue20/fulltext/8261/img007.gif)
|
(A7)
|
where  2[BD] is the
differential operator defined in Equation A1. The relevant parameters
are listed in Table 2.
Integration
A set of partial differential equations (PDEs) was integrated to
calculate the spread of free Ca2+. The first PDE in
Equation A7 determines the concentration of Ca2+-free diffusible buffer (BAPTA or calbindin) of
each compartment and, using the same equation, the second PDE
determines the concentration of Ca2+-free ATP. The
third PDE integrates the various components giving the total rate of
change of [Ca2+], which is a summation of
Equations A1, A3, A4, and A6:
![<FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR>=<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>difusion</UP></SUB>+<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>influx</UP></SUB>](/content/vol18/issue20/fulltext/8261/img008.gif)
|
(A8)
|
![+<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>ext</UP></SUB>+<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>mobile</UP></SUB>](/content/vol18/issue20/fulltext/8261/img009.gif)
|
(A8)
|
Finite difference equations and boundary conditions are analogous
to those described previously (Wu et al., 1996), with the exception
that the [Ca2+] at the bottom of the stereocilium
was set to 0.1 µM for all simulations. Initially, a
random profile was assigned to the compartments, and the distributions
were then optimized to satisfy Equations A6-A8. Successive
overrelaxation with a checkerboard ordering method (Strikverda,
1989) was modified for variable grids (Wu et al., 1996) to
compute iteratively the steady-state [Ca2+]
profiles. The compartment size in both the r- and
z- directions was increased incrementally with distance from
the source, from 1 nm close to the channel up to 10 nm at 200 nm from
the channel.
| |
REFERENCES |
-
Art JJ,
Fettiplace R
(1987)
Variation of membrane properties in hair cells isolated form the turtle cochlea.
J Physiol (Lond)
385:207-242[Abstract/Free Full Text].
-
Assad JA,
Hacohen N,
Corey DP
(1989)
Voltage dependence of adaptation and active bundle movements in bullfrog saccular hair cells.
Proc Natl Acad Sci USA
86:2918-2922[Abstract/Free Full Text].
-
Baird RA,
Steyger PS,
Schuff NR
(1997)
Intracellular distribution and putative functions of calcium-binding proteins in the bullfrog vestibular otolith.
Hear Res
103:85-100[Web of Science][Medline].
-
Benser ME,
Marquis RE,
Hudspeth AJ
(1996)
Rapid, active hair bundle movements in hair cells from the bullfrog's sacculus.
J Neurosci
16:5629-5643[Abstract/Free Full Text].
-
Bredderman PJ,
Wasserman RH
(1974)
Chemical composition, affinity for calcium, and some related properties of the vitamin D dependent calcium-binding protein.
Biochemistry
13:1687-1694[Medline].
-
Chard PS,
Bleakman D,
Christakos S,
Fullmer CS,
Miller RJ
(1993)
Calcium buffering properties of calbindin D28k and parvalbumin in rat sensory neurons.
J Physiol (Lond)
472:341-357[Abstract/Free Full Text].
-
Crawford AC,
Fettiplace R
(1980)
The frequency selectivity of auditory nerve fibres and hair cells in the cochlea of the turtle.
J Physiol (Lond)
306:79-125[Abstract/Free Full Text].
-
Crawford AC,
Fettiplace R
(1981a)
Non-linearities in the responses of turtle hair cells.
J Physiol (Lond)
315:317-338[Abstract/Free Full Text].
-
Crawford AC,
Fettiplace R
(1981b)
An electrical tuning mechanism in turtle cochlear hair cells.
J Physiol (Lond)
312:377-412[Abstract/Free Full Text].
-
Crawford AC,
Fettiplace R
(1985)
The mechanical properties of ciliary bundles of turtle cochlear hair cells.
J Physiol (Lond)
364:359-379[Abstract/Free Full Text].
-
Crawford AC,
Evans MG,
Fettiplace R
(1989)
Activation and adaptation of transducer currents in turtle hair cells.
J Physiol (Lond)
419:405-434[Abstract/Free Full Text].
-
Crawford AC,
Evans MG,
Fettiplace R
(1991)
The actions of calcium on the mechano-electrical transducer current of turtle hair cells.
J Physiol (Lond)
434:369-398[Abstract/Free Full Text].
-
Crouch JJ,
Schulte BA
(1995)
Expression of plasma membrane Ca-ATPase in the adult and developing gerbil cochlea.
Hear Res
92:112-119[Web of Science][Medline].
-
Denk W,
Holt JR,
Shepherd GMG,
Corey DP
(1995)
Calcium imaging of single stereocilia in hair cells: localization of transduction channels at both ends of tip links.
Neuron
15:1311-1321[Web of Science][Medline].
-
Eatock RA,
Corey DP,
Hudspeth AJ
(1987)
Adaptation of mechanoelectrical transduction in hair cells of the bullfrog's sacculus.
J Neurosci
7:2821-2836[Abstract].
-
Fettiplace R,
Crawford AC
(1978)
The coding of sound pressure and frequency in cochlear hair cells of the terrapin.
Proc R Soc Lond B Biol Sci
203:209-218[Medline].
-
Garrahan PJ,
Rega AF
(1990)
Plasma membrane calcium pump.
In: Intracellular calcium regulation (Bronner F,
ed), pp 271-303. New York: Wiley Liss.
-
Hackney CM,
Fettiplace R,
Furness DN
(1993)
The functional morphology of stereociliary bundles on turtle cochlear hair cells.
Hear Res
69:163-175[Web of Science][Medline].
-
Hall JD,
Betarbet S,
Jaramillo F
(1997)
Endogenous buffers limit spread of free calcium in hair cells.
Biophys J
73:1243-1252[Web of Science][Medline].
-
Horn R,
Marty A
(1988)
Muscarinic activation of ionic currents measured with a new whole-cell recording method.
J Gen Physiol
92:145-159[Abstract/Free Full Text].
-
Hudspeth AJ
(1982)
Extracellular current flow and the site of transduction by vertebrate hair cells.
J Neurosci
2:1-10[Abstract].
-
Jaramillo F,
Hudspeth AJ
(1992)
Localization of the hair cell's transduction channels at the hair bundle's top by iontophoretic application of a channel blocker.
Neuron
7:409-420.
-
London RE,
Rhee CK,
Murphy E,
Gabel S,
Levy LA
(1994)
NMR-sensitive fluorinated and fluorescent intracellular calcium ion indicators with high dissociation constant.
Am J Physiol
266:C1313-C1322[Abstract/Free Full Text].
-
Lumpkin EA,
Hudspeth AJ
(1995)
Detection of Ca2+entry through mechanosensitive channels localizes the site of mechanoelectrical transduction in hair cells.
Proc Natl Acad Sci USA
92:10297-10301[Abstract/Free Full Text].
-
Martin SR,
Linse S,
Johnson C,
Bayley PM,
Forsen S
(1990)
Protein surface charges and Ca2+ binding to individual sites in calbindin D9K: stopped flow studies.
Biochemistry
29:4188-4193[Medline].
-
Naraghi M,
Neher E
(1997)
Linearized buffered Ca2+ diffusion in microdomains and its implications for calculations of [Ca2+] at the mouth of a calcium channel.
J Neurosci
17:6961-6973[Abstract/Free Full Text].
-
Navaratnam DS,
Escobar L,
Covarrubias M,
Oberholtzer JC
(1995)
Permeation properties and differential expression across the auditory receptor epithelium of an inward rectifier K+ channel cloned from the chick inner ear.
J Biol Chem
270:19238-19245[Abstract/Free Full Text].
-
Neher E
(1986)
In: Concentration profiles of intracellular calcium in the presence of a diffusible chelator In: Calcium electrogenesis and neuronal functioning (Heinemann U, Klee M, Neher E, Singer W, eds), pp 80-96. Berlin: Springer.
-
Oberholtzer JC,
Buettger C,
Summers MC,
Matschinsky FM
(1988)
The 28 kDa calbindin-D is a major calcium-binding protein in the basilar papilla of the chick.
Proc Natl Acad Sci USA
85:3387-3390[Abstract/Free Full Text].
-
Oliva C,
Cohen IS,
Mathias RT
(1988)
Calculations of time constants for intracellular diffusion in whole-cell patch configuration.
Biophys J
54:791-799[Web of Science][Medline].
-
Pack AK,
Slepecky NB
(1995)
Cytoskeletal and calcium-binding proteins in the mammalian organ of Corti; cell type-specific proteins displaying longitudinal and radial gradients.
Hear Res
91:119-135[Web of Science][Medline].
-
Pethig R,
Kuhn M,
Payne R,
Adler E,
Chen T-H,
Jaffe LF
(1989)
On the dissociation constants of BAPTA-type calcium buffers.
Cell Calcium
10:491-498[Web of Science][Medline].
-
Rae J,
Cooper K,
Gates P,
Watsky M
(1991)
Low access resistance perforated patch recordings with amphotericin B.
J Neurosci Methods
37:15-26[Web of Science][Medline].
-
Ricci AJ,
Fettiplace R
(1997)
The effects of calcium buffering and cyclic AMP on mechano-electrical transduction in turtle auditory hair cells.
J Physiol (Lond)
501:111-124[Abstract/Free Full Text].
-
Ricci AJ,
Fettiplace R
(1998)
Calcium permeation of the turtle hair cell's mechanotransducer channel and its relation to the composition of endolymph.
J Physiol (Lond)
506:159-173[Abstract/Free Full Text].
-
Roberts WM
(1993)
Spatial calcium buffering in saccular hair cells.
Nature
363:74-76[Medline].
-
Roberts WM
(1994)
Localization of calcium signals by a mobile calcium buffer in frog saccular hair cells.
J Neurosci
14:3246-3262[Abstract].
-
Sala F,
Hernández-Cruz A
(1990)
Calcium diffusion modeling in a spherical neuron: relevance of buffering properties.
Biophys J
57:313-324[Web of Science][Medline].
-
Shepherd GMG,
Barres BA,
Corey DP
(1989)
`Bundle blot' purification and initial protein characterization of hair cell stereocilia.
Proc Natl Acad Sci USA
86:4973-4977[Abstract/Free Full Text].
-
Stern MD
(1992)
Buffering of calcium in the vicinity of a channel pore.
Cell Calcium
13:183-192[Web of Science][Medline].
-
Strickverda JC
(1989)
In: Finite difference schemes and partial differential equations. Pacific Grove: Wadsworth and Brooks.
-
Tsien RY
(1980)
New calcium indicators with high selectivity against magnesium and protons: design, synthesis, and properties of prototype structures.
Biochemistry
19:2396-2404[Medline].
-
Tucker T,
Fettiplace R
(1995)
Confocal imaging of calcium microdomains and calcium extrusion in turtle hair cells.
Neuron
15:1323-1335[Web of Science][Medline].
-
Tucker T,
Fettiplace R
(1996)
Monitoring calcium in turtle hair cells with a calcium-activated potassium channel.
J Physiol (Lond)
494:613-626[Abstract/Free Full Text].
-
Yamoah EN,
Gillespie PG
(1996)
Phosphate analogs block adaptation in hair cells by inhibiting adaptation-motor force production.
Neuron
17:523-533[Web of Science][Medline].
-
Yamoah EN,
Lumpkin EA,
Dumont RA,
Smith PJS,
Hudpseth AJ,
Gillespie PG
(1998)
Plasma membrane Ca2+-ATPase extrudes Ca2+ from hair cell stereocilia.
J Neurosci
18:610-624[Abstract/Free Full Text].
-
Walker RG,
Hudspeth AJ
(1996)
Calmodulin controls adaptation of mechanoelectrical transduction by hair cells of the bullfrog's sacculus.
Proc Natl Acad Sci USA
93:2203-2207[Abstract/Free Full Text].
-
Wu Y-C,
Art JJ,
Goodman MB,
Fettiplace R
(1995)
A kinetic description of the calcium-activated potassium channel and its application to electrical tuning of hair cells.
Prog Biophys Mol Biol
63:131-158[Web of Science][Medline].
-
Wu Y-C,
Fettiplace R
(1996)
A developmental model for generating frequency maps in the reptilian and avian cochleas.
Biophys J
70:2557-2570[Web of Science][Medline].
-
Wu Y-C,
Tucker T,
Fettiplace R
(1996)
A theoretical study of calcium microdomains in turtle hair cells.
Biophys J
71:2256-2275[Web of Science][Medline].
-
Zhou Z,
Neher E
(1993)
Mobile and immobile calcium buffers in bovine adrenal chromaffin cells.
J Physiol (Lond)
469:245-273[Abstract/Free Full Text].
Copyright © 1998 Society for Neuroscience 0270-6474/98/18208261-17$05.00/0
This article has been cited by other articles:
|
|
|
|
 
T. A. Ghanem, K. D. Breneman, R. D. Rabbitt, and H. M. Brown
Ionic Composition of Endolymph and Perilymph in the Inner Ear of the Oyster Toadfish, Opsanus tau
Biol. Bull.,
February 1, 2008;
214(1):
83 - 90.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
J. Waguespack, F. T. Salles, B. Kachar, and A. J. Ricci
Stepwise Morphological and Functional Maturation of Mechanotransduction in Rat Outer Hair Cells
J. Neurosci.,
December 12, 2007;
27(50):
13890 - 13902.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
F. Mammano, M. Bortolozzi, S. Ortolano, and F. Anselmi
Ca2+ Signaling in the Inner Ear
Physiology,
April 1, 2007;
22(2):
131 - 144.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
S. Jia, P. Dallos, and D. Z. Z. He
Mechanoelectric Transduction of Adult Inner Hair Cells
J. Neurosci.,
January 31, 2007;
27(5):
1006 - 1014.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
R. Ficarella, F. Di Leva, M. Bortolozzi, S. Ortolano, F. Donaudy, M. Petrillo, S. Melchionda, A. Lelli, T. Domi, L. Fedrizzi, et al.
A functional study of plasma-membrane calcium-pump isoform 2 mutants causing digenic deafness
PNAS,
January 30, 2007;
104(5):
1516 - 1521.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
H. E. Farris, G. B. Wells, and A. J. Ricci
Steady-State Adaptation of Mechanotransduction Modulates the Resting Potential of Auditory Hair Cells, Providing an Assay for Endolymph [Ca2+]
J. Neurosci.,
November 29, 2006;
26(48):
12526 - 12536.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
M. H. Rowe and E. H. Peterson
Autocorrelation Analysis of Hair Bundle Structure in the Utricle
J Neurophysiol,
November 1, 2006;
96(5):
2653 - 2669.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
R. Fettiplace
Active hair bundle movements in auditory hair cells
J. Physiol.,
October 1, 2006;
576(1):
29 - 36.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
A. J. Ricci, H. J. Kennedy, A. C. Crawford, and R. Fettiplace
The Transduction Channel Filter in Auditory Hair Cells
J. Neurosci.,
August 24, 2005;
25(34):
7831 - 7839.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
S. M. Highstein, R. D. Rabbitt, G. R. Holstein, and R. D. Boyle
Determinants of Spatial and Temporal Coding by Semicircular Canal Afferents
J Neurophysiol,
May 1, 2005;
93(5):
2359 - 2370.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
K. Nagata, A. Duggan, G. Kumar, and J. Garcia-Anoveros
Nociceptor and Hair Cell Transducer Properties of TRPA1, a Channel for Pain and Hearing
J. Neurosci.,
April 20, 2005;
25(16):
4052 - 4061.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
T. Collin, M. Chat, M. G. Lucas, H. Moreno, P. Racay, B. Schwaller, A. Marty, and I. Llano
Developmental Changes in Parvalbumin Regulate Presynaptic Ca2+ Signaling
J. Neurosci.,
January 5, 2005;
25(1):
96 - 107.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
G. A. Manley, U. Sienknecht, and C. Koppl
Calcium Modulates the Frequency and Amplitude of Spontaneous Otoacoustic Emissions in the Bobtail Skink
J Neurophysiol,
November 1, 2004;
92(5):
2685 - 2693.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
T. Gollisch and A. V. M. Herz
Input-Driven Components of Spike-Frequency Adaptation Can Be Unmasked In Vivo
J. Neurosci.,
August 25, 2004;
24(34):
7435 - 7444.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
H. E. Farris, C. L. LeBlanc, J. Goswami, and A. J. Ricci
Probing the pore of the auditory hair cell mechanotransducer channel in turtle
J. Physiol.,
August 1, 2004;
558(3):
769 - 792.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
M. A. Vollrath and R. A. Eatock
Time Course and Extent of Mechanotransducer Adaptation in Mouse Utricular Hair Cells: Comparison With Frog Saccular Hair Cells
J Neurophysiol,
October 1, 2003;
90(4):
2676 - 2689.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
P. Martin, D. Bozovic, Y. Choe, and A. J. Hudspeth
Spontaneous Oscillation by Hair Bundles of the Bullfrog's Sacculus
J. Neurosci.,
June 1, 2003;
23(11):
4533 - 4548.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
C. M. Hackney, S. Mahendrasingam, E. M. C. Jones, and R. Fettiplace
The Distribution of Calcium Buffering Proteins in the Turtle Cochlea
J. Neurosci.,
June 1, 2003;
23(11):
4577 - 4589.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
T. Gollisch, H. Schutze, J. Benda, and A. V. M. Herz
Energy Integration Describes Sound-Intensity Coding in an Insect Auditory System
J. Neurosci.,
December 1, 2002;
22(23):
10434 - 10448.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
A. Ricci
Differences in Mechano-Transducer Channel Kinetics Underlie Tonotopic Distribution of Fast Adaptation in Auditory Hair Cells
J Neurophysiol,
April 1, 2002;
87(4):
1738 - 1748.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
R. A. Dumont, U. Lins, A. G. Filoteo, J. T. Penniston, B. Kachar, and P. G. Gillespie
Plasma Membrane Ca2+-ATPase Isoform 2a Is the PMCA of Hair Bundles
J. Neurosci.,
July 15, 2001;
21(14):
5066 - 5078.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
J. R. Holt and D. P. Corey
Two mechanisms for transducer adaptation in vertebrate hair cells
PNAS,
October 24, 2000;
97(22):
11730 - 11735.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
A. J. Ricci, A. C. Crawford, and R. Fettiplace
Active Hair Bundle Motion Linked to Fast Transducer Adaptation in Auditory Hair Cells
J. Neurosci.,
October 1, 2000;
20(19):
7131 - 7142.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
A J Ricci, M Gray-Keller, and R Fettiplace
Tonotopic variations of calcium signalling in turtle auditory hair cells
J. Physiol.,
April 15, 2000;
524(2):
423 - 436.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
M. Smotherman and P. Narins
Hair cells, hearing and hopping: a field guide to hair cell physiology in the frog
J. Exp. Biol.,
January 8, 2000;
203(15):
2237 - 2246.
[Abstract]
[PDF]
|
|
|
|
|
|
|
Y.-C. Wu, A. J. Ricci, and R. Fettiplace
Two Components of Transducer Adaptation in Auditory Hair Cells
J Neurophysiol,
November 1, 1999;
82(5):
2171 - 2181.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
F. Mammano, G. I. Frolenkov, L. Lagostena, I. A. Belyantseva, M. Kurc, V. Dodane, A. Colavita, and B. Kachar
ATP-Induced Ca2+ Release in Cochlear Outer Hair Cells: Localization of an Inositol Triphosphate-Gated Ca2+ Store to the Base of the Sensory Hair Bundle
J. Neurosci.,
August 15, 1999;
19(16):
6918 - 6929.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
|
|
|
Y. Choe, M. O. Magnasco, and A. J. Hudspeth
A model for amplification of hair-bundle motion by cyclical binding of Ca2+ to mechanoelectrical-transduction channels
PNAS,
December 22, 1998;
95(26):
15321 - 15326.
[Abstract]
[Full Text]
[PDF]
|
|
|
|
Top
Abstract
Introduction
![+<FENCE><FR><NU>∂[<UP>Ca<SUP>2+</SUP></UP>]</NU><DE>∂t</DE></FR></FENCE><SUB><UP>ATP</UP></SUB>=0.](/content/vol18/issue20/fulltext/8261/img010.gif)
Compound via MeSH
