Correspondence to Toshinori Hoshi: hoshi{at}hoshi.org
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INTRODUCTION |
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While the majority of cellular heme may be bound to proteins, some "uncommitted" or "free" heme likely exists (Ponka, 1999). Precise estimates of free intracellular heme concentration are not widely available because of technical problems, but an estimate of >1 µM has been reported for reticulocytes (Garrick et al., 1999
). In neuronal cells, intracellular heme concentration may dramatically increase following hemorrhagic strokes. These vascular accidents lead to a breakdown of hemoglobin and release of heme in the extracellular medium (Wagner and Dwyer, 2004
). Extracellular heme is transported across the cell membrane by a protenacious mechanism, thereby increasing the intracellular concentration (Worthington et al., 2001
).
Increasing evidence suggests that intracellular heme acts as a signaling molecule (Padmanaban et al., 1989). For example, heme reversibly binds to selected transcription factors and initiates cellular signal transduction events involving diverse classes of proteins (Zhang and Hach, 1999
). Aside from the selected heme-binding transcription factors, how other proteins involved in signal transduction, such as ion channels, are acutely regulated by heme is not well understood. As a first step toward identification of the effectors of intracellular heme, we have recently shown that heme binds to a cytoplasmic domain of a large conductance Ca2+-dependent potassium (Slo1 BK) channels, a key inhibitory component in neuronal and muscle excitability, and drastically reduces the channel activity (Tang et al., 2003
). While the detailed mechanism of the heme-mediated inhibition of heterologously expressed Slo1 BK channels is not yet known, the effect is exquisitely potent, with a typical IC50 value of <80 nM. This high sensitivity suggests that heme or a heme-like endogenous substance may be a potent modulator of Slo1 BK channels, especially during "heme stress," such as that following hemorrhagic strokes (Wagner and Dwyer, 2004
). Such injuries are often followed by cerebral vasospasm, in which an inhibition of the Slo1 BK channel function may play a critical role (Aihara et al., 2004
; Williams et al., 2004
).
Gating of the Slo1 BK channel is allosterically controlled by voltage and divalent cations (e.g., Cox et al., 1997; Rothberg and Magleby, 2000
; summarized in Magleby, 2003
; Rothberg, 2004
). The activation gate of the Slo1 BK channel may be opened by depolarization alone without Ca2+, or Ca2+ alone without depolarization, but under physiological conditions, both Ca2+ and depolarization work synergistically to activate the channel (Cui et al., 1997
). This multidimensional allosteric characteristic allows Slo1 BK channels to participate in multitudes of physiological phenomena, generally exerting a finely tuned negative influence on cellular excitability (Sah, 1996
; Vergara et al., 1998
).
The physiological versatility of the Slo1 BK channel based on its multidimensional allosteric property complicates studies of its modulation. A given modulator, such as heme, may alter the channel function by affecting any one of the allosteric interactions, and its overall effect may be excitatory or inhibitory, depending on voltage and the divalent ion concentration. Here we investigated how heme inhibits the Slo1 BK channel by separating the influences of voltage and divalent cations. Measurements and simulations of ionic and gating currents show that heme decreases the allosteric coupling of voltage sensor activation and Ca2+ binding to channel opening.
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MATERIALS AND METHODS |
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Ionic Current Measurements
Macroscopic and single-channel ionic currents were recorded in the inside-out configuration using an AxoPatch 200B amplifier (Axon Instruments) essentially as previously described (Tang et al., 2001; Avdonin et al., 2003
). When filled with the solutions described below, the typical input resistance of electrodes for macroscopic currents was 1.5 M
while that for single-channel currents was >3 M
. Approximately 1.2 M
of the series resistance was electronically compensated in the macroscopic recordings. Typically, macroscopic tail currents started to decay exponentially within 6070 µs of a voltage step and the initial 100-µs segments were excluded from analysis. Unless otherwise stated, macroscopic capacitative and leak currents were subtracted using a P/6 protocol from the leak holding voltage of 50 mV. When necessary, single-channel records without any openings were used to subtract single-channel leak and capacitative components. Both macroscopic and single-channel data were filtered through the built-in filter circuit of the patch-clamp amplifier at 10 kHz and digitized at 100 kHz (ITC16; Instrutech). Data acquisition was controlled by a custom software (PatchMachine) (Tang et al., 2001
, 2004
; Avdonin et al., 2003
) running on Mac OS 10.
Composite single-channel iV curves were obtained using voltage ramp protocols (Hoshi, 1995). In brief, this involved averaging different segments of data recorded in response to ramp depolarization into different bins. Typically, openings were elicited by voltage ramp stimulation from 0 to 240 mV and then back to 0 mV in 10 ms.
Gating Current Measurements
Gating currents were measured as previously described (Horrigan and Aldrich, 2002). In brief, inside-out patches expressing mSlo1 channels were excised into nominally K+-free solutions containing isotonic TEA in the extracellular solution to block any residual ionic currents. Voltage commands were filtered at 20 kHz to limit capacitive transients. Currents were filtered at 20 kHz, sampled at 200 kHz, and leak subtracted using a P/4 protocol.
Solutions
For ionic current measurements, the extracellular solution contained (in mM) 140 KCl, 2 MgCl2, 10 HEPES, pH 7.2 with NMDG. The "zero" divalent internal solution contained (in mM) 140 KCl, 11 EGTA, 10 HEPES, pH 7.2 with NMDG. The internal solution with 1 µM [Ca2+] contained (in mM) 140 KCl, 10 HEDTA, 2.4 CaCl2, 10 HEPES, pH 7.2 with NMG. The "saturating" Ca2+/Mg2+ solution contained (in mM) 140 KCl, 10 MgCl2, 0.12 CaCl2, 10 HEPES, pH 7.2 with NMG. Free [Ca2+] levels were calculated by Patcher's Power Tools v1.0 (F. Mendez; http://www.mpibpc.gwdg.de/abteilungen/140/software/).
For gating current measurements, the extracellular solution contained (in mM) 130 TEA, 20 HEPES, 2 MgCl2, 6 HCl, pH 7.2 with methanesulfonic acid (MES). The internal solution contained (in mM) 140 NMDG, 5 EGTA, 20 HEPES, 25 HCl, pH 7.2 with MES.
Heme was applied in the form of iron protoporphyrin IX chloride (hemin; Sigma-Aldrich). Heme was dissolved, diluted with the desired internal solution to 10 µM, and stored at 80°C. For each experiment, a fresh tube was thawed immediately before use and diluted to the final concentrations. Electrophysiology experiments with heme were performed with a minimum of illumination. To change the bath heme concentration, the recording chamber (150 µl) was washed with 1 ml of a new solution and 4 min was allowed to elapse before measurements. The effects of heme were partially reversible with wash but the recovery time course was variable. The time course observed was generally faster than that reported by Tang et al. (2003)
. It is not clear what accounts for the difference. To obtain concentration dependence data, each patch was treated with increasing concentrations of heme.
Data Analysis
Data were analyzed using PatchMachine (Tang et al., 2001, 2004
; Avdonin et al., 2003
) and IgorPro (Wavemetrics) running on Mac OS 10. Tail currents at 40 mV following pulses to different voltages were fit with a single exponential to extrapolate instantaneous current amplitudes. The voltage dependence of the instantaneous current size was then fit with a Boltzmann equation to estimate the maximum macroscopic conductance (Gmax) values and the normalized GV curve. Macroscopic kinetics of Slo1 currents was characterized using a single exponential, and the voltage dependence of the time constant was in turn fitted with an exponential function. To measure open probability and dwell times, the openings were idealized using the hidden Markov method as implemented in PatchMachine (Avdonin et al., 2000
). First latency distributions were corrected for the number of channels present (Aldrich et al., 1983
), and the fractional number of blank sweeps is obtained from the corrected distribution. The free energy contribution of divalent ions to channel activation was determined using the formulation of Cui and Aldrich (2000)
as implemented previously (Tang et al., 2004
). Gating current data were analyzed as described in Horrigan and Aldrich (2002)
.
Simulation
Simulated currents were generated and analyzed using PatchMachine and IgorPro as performed with experimental data. The effects of leak and capacitance subtraction, series resistance, and the built-in filter of the amplifier were not considered. The single-channel conductance was set at 250 pS. Simulated single-channel data contained Gaussian noise whose RMS noise level corresponded to that of typical experimental data (1 pA).
The values of the parameters in the HCA model (Horrigan et al., 1999) were estimated in the following manner. The macroscopic tail kinetics and the open probability values estimated from the single-channel data at extreme negative voltages determined the initial values of
0 and L0. The voltage dependence of the deactivation kinetics at negative voltages determined the partial charge associated with
0-4. The macroscopic activation kinetics at extreme voltages estimated the value of
4. Then the values of D,
2, and
3 (see Fig. 1) were adjusted so that the simulated macroscopic GV, kinetics of the ionic currents, and the single-channel open probability matched the respective average experimental data as judged by eye. The
0 value in this study is smaller than that reported previously for mSlo1 (Horrigan et al., 1999
), but it is unclear what accounts for the difference. As in Horrigan et al. (1999)
, the values of
0 and
1 were assumed to be the same. The values of
2 and
3 were adjusted to fit the voltage dependence of the kinetics of macroscopic current relaxation with the constraint that the values of
's are a monotonic function of voltage. The simulation process did not consider the heme-mediated decrease in the maximum macroscopic conductance.
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Statistics
Statistical comparisons were made using t test or paired t test as appropriate with DataDesk (Data Description). Statistical significance was assumed at P 0.05. Where appropriate, data are presented as mean ± SEM.
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RESULTS |
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Application of heme (100 nM) to the cytoplasmic side of the channel progressively decreased the Slo1 current size at 160 mV to 36 ± 19% (n = 17) of the control amplitude with a pseudo second-order rate constant of 2.2 x 105 ± 1.2 x 104 s1*M1 (n = 17; Fig. 2 A). As reported earlier (Tang et al., 2003
), the fractional inhibition of the current and the time course of the development of the current inhibition were notably variable among the patches examined. When heme was applied without repeated depolarization (Fig. 2 B), the fractional inhibition of the current was unaltered (
21 ± 14%, n = 3, P = 0.17). The effectiveness of heme in the absence of divalent ions suggested that the underlying mechanism likely involved the intrinsic and/or voltage-dependent gating of the Slo1 channel. Furthermore, the inhibitory efficacy of heme did not require depolarization-mediated channel opening.
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Open-channel iV
Despite the dramatic reduction in the macroscopic current described above, the open-channel iV properties of Slo1 remained largely unaltered. The composite iV curves for the main conductance state in the control condition and the experimental condition with heme (100 nM; Fig. 3 A, left and right sweeps 1 and 2) were indistinguishable (Fig. 3 B). However, in the presence of heme, smaller conductance levels, corresponding to 60 and 40% of the full level (Fig. 3 A, sweeps 3 and 4), were more frequently observed. The increased occurrence of these substates was unequivocal, but the extent of the increase was, however, variable from one patch to the next and difficult to quantify. The rectification properties of these substates were not markedly different from those of the main state. While the occurrence of these substates probably contributed to the macroscopic current inhibition by heme, most of the inhibitory effect of heme was likely mediated by changes in the channel gating as described below.
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Single-channel Gating
Consistent with the idea that heme alters the gating of Slo1, application of heme (100 nM) drastically decreased the peak open probability (Fig. 5). At 170 mV, heme decreased the peak probability value from 0.62 ± 0.05 to 0.08 ± 0.02 (P 0.0001). The decrease in open probability was accompanied by a significant decrease in the mean open duration from 2.3 ± 0.3 to 0.70 ± 0.17 ms (P = 0.004).
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More notably, heme significantly increased the number of blank sweeps (depolarization epochs during which a channel failed to open) (Fig. 5 D). In the control condition, 10% of the pulses to 170 mV (
50 ms in duration) failed to elicit at least one opening. In the presence of heme (100 nM), up to 60% of the pulses to 170 mV produced no opening. Greater depolarization to 240 mV (
40 ms), where the normalized macroscopic conductance is 0.850.9 (Fig. 4 C), did not appreciably decrease the number of blank sweeps (Fig. 5 D). As shown later, these pulse durations (
40 ms) were at least 10 times greater than the time constant of the macroscopic current activation (see Fig. 8). The presence of these blank sweeps suggested that heme remained functionally associated with the channels even at extreme positive voltages and contributed to the macroscopic current inhibition.
The blank sweeps are likely the result of a very slow gating component and they might be eliminated if the depolarization duration was increased. However, the patch instability associated with repeated extreme depolarization prevented us from testing this idea. In some macroscopic currents, we observed but did not quantify a minor and variable slow component.
Dependence of Macroscopic GV on Heme Concentration
Heme progressively inhibited the currents recorded at >50 mV in a concentration-dependent manner (Fig. 6 A). Even in the presence of heme, the macroscopic conductance saturated with very large depolarization. This is illustrated in Fig. 6 B where the tail currents recorded at 40 mV following prepulses to different voltages pulses are shown superimposed. Depolarization to >350 mV did not further increase the tail current, indicating that the macroscopic conductance saturated.
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When the GV curves were normalized to infer the properties of the channels that opened in the presence of heme, we found that the inhibition of the Slo1 current was accompanied by shallower and right-shifted normalized GVs (Fig. 6 D). Each normalized GV curve was characterized by a simple Boltzmann function as a data descriptor function, and the values of the two parameters, V0.5 and the apparent charge movement (Qapp), are summarized in Fig. 6 (E and F). The rightward shift of GV became noticeable starting at 30 nM heme, which produced a 20 mV shift in V0.5. The shift saturated with 300 nM heme, producing a V0.5 shift of 80 to 100 mV. Concomitantly with the rightward shift in V0.5, heme also decreased Qapp so that the GV curves were markedly shallower. The effect of heme in reducing Qapp saturated around 100 nM, producing a
40% decrease from 1.2 ± 0.04 e in the control condition to 0.78 ± 0.02 e (100 nM; Fig. 6 F). It is noteworthy that the decrease in Qapp persisted even with the highest concentration of heme tested, supporting the idea that heme-bound channels are characterized by a shallow GV.
The concentration dependence of the changes in Gmax, V0.5, and Qapp was adequately described with an apparent Kd value of 60 nM, assuming binding of one heme molecule was sufficient to induce the effects (Fig. 6, C, E, and F). However, this assumption is not specifically addressed by the results available.
Gating Currents
The changes in GV caused by heme (Fig. 6) could be explained in several ways. One possibility is that heme directly interferes with the voltage-sensing charge movements involving S4, which are represented by the horizontal transitions in the HCA model (Fig. 1; Horrigan et al., 1999). If these voltage-dependent steps that normally precede channel opening are impeded by heme, ON gating currents (IgON) may be reduced in size and slower at a given voltage. Representative gating currents elicited by brief 0.5-ms pulses from 80 to 200 mV before and after application of heme (300 nM) are compared in Fig. 7 A. This concentration of heme reduced the peak ionic currents by up to 75% (Fig. 6) but had a much smaller effect on the gating currents. The peak IgON and IgOFF were reduced by <15%, and their kinetics were not appreciably altered by heme.
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In the experiment shown, Boltzmann fits to the QCV curves indicated that the gating charge half-activation voltage (QCV0.5) shifted to more positive voltages by 20 mV. On average, QCV0.5 increased by only +22 ± 3 mV (n = 4), which is markedly less than the 80100 mV shift in V0.5, (see Fig. 6). The total charge movement approximated by the amplitude of the QCV fit (QCmax) also decreased slightly (Fig. 7 B). However, this decrease of 7 ± 2% (n = 4) was small compared with the effect of heme on Gmax (Fig. 6 C). The QCV curves in the presence and absence of heme were well fit by Boltzmann functions with identical voltage sensor charge (zJ = 0.58 e) (Fig. 7, B and C). The value of zJ was fixed to the mean value determined from many control experiments (Horrigan and Aldrich, 1999
) because zJ determined from individual experiments is very sensitive to scatter in the data and, if allowed to vary, would obscure small changes in QCV0.5 and QCmax. It is clear from Fig. 7 (B and C) that any change in zJ, if any, must be small and cannot account for the reduced steepness of the GV. If the
40% decrease in Qapp resulted from a 40% reduction in voltage sensor charge, then a decrease in the limiting logarithmic slope of QCV, which is directly proportional to zJ, would be clearly evident (Fig. 7 C, dashed trace). Similarly, the failure to observe a large decrease in QCmax (Fig. 7 B) is inconsistent with a large decrease in zJ.
The effects of heme on Qc were small and may even be overestimated by our experiments. Small slow decreases in QCmax and/or positive shifts in QCV0.5 were sometimes observed in the absence of heme. Because heme acts slowly and is poorly reversible, we could not rule out that such spontaneous effects contribute to the observed changes in QCV (e.g., Fig. 7 B). However, heme did account for at least some of the QCV changes because they were partially reversed by heme washout (unpublished data).
Heme had little effect on gating currents evoked by brief voltage pulses (Fig. 7 A) but it had noticeable effects on IgOFF following prolonged (520 ms) depolarization (Fig. 7 D), consistent with the ability of heme to inhibit channel opening. IgOFF was slowed following pulses that open Slo1 channels, reflecting transitions among the bottom row of horizontal transitions in the HCA model (Fig. 1). Consequently, IgOFF decays exponentially following a brief pulse, but an additional slow component, whose amplitude reflects the fraction of open channels, appears following prolonged depolarization (Horrigan and Aldrich, 1999). The slow component of IgOFF (Fig. 7 D, dashed lines) was reduced by >50% by heme (300 nM), indicating a marked decrease in open probability. Thus, the small effects of heme on QC do not represent a failure of heme to effectively inhibit channel gating under the conditions used to study gating currents. These results taken together suggest that heme did not markedly impede the voltage sensor function when channels are closed.
Heme Slows Macroscopic Activation and Deactivation
Heme altered the kinetics of Slo1 ionic currents in a voltage-dependent manner (Fig. 8 A). The current relaxation time courses were slower after heme application at extreme negative and positive voltages, but at intermediate voltages they were faster (Fig. 8 A).
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Heme Increases the Open Probability at Negative Voltages
Heme reduced the steepness of the Slo1 GV curve (see Fig. 6). If the reduced steepness is maintained at more negative voltages, the GV curves in the control and experimental conditions may cross over so that the channel open probability may be in fact greater after heme treatment at the negative voltages. A similar prediction about the enhanced open probability with heme can be made from the observation that heme slowed the deactivation kinetics at very negative voltages (Fig. 8). Representative openings recorded before and after application of heme (100 nM) at 50, 100, and 150 mV, where the voltage sensormediated activation of the channel should be negligible, are shown in Fig. 9. In contrast with the results obtained at more positive voltages, heme strikingly increased the open probability, typically by 1020-fold without a significant change in the voltage dependence (Fig. 9 B). The increase in the open probability was associated with a significant increase in the mean open duration by
50% (P < 0.01; Fig. 9 C) at each voltage. The mean open durations observed at these voltages were smaller than the time constants of the macroscopic tail currents (Fig. 8).
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A shallower and right-shifted GV could be simulated in multiple ways using the HCA model. Changes in the steeply voltage-dependent rate constants and ß (the equilibrium constant J) in the HCA model could induce changes in GV similar to those experimentally observed. However, because the kinetic and steady-state properties of gating currents were not greatly affected by heme (Fig. 7), we deemed that the changes in
and ß were unlikely to underlie the heme effect. Changes in the equilibrium constant between the closed state C0 and the open state O0, L0 in the HCA formulation, could also alter the steepness of GV. A decrease in L0 caused by greater
0 and/or smaller
0 shifts the GV position and decreases the steepness as found with heme. However, this GV modification also decreased the open probability at negative voltages, exactly the opposite of what was observed. A decrease in the allosteric factor D in the HCA model decreases the GV steepness, but this change does not appreciably increase open probability at negative voltages as experimentally observed. Thus, alterations in D or L0 alone fail to account for the experimental findings.
However, a decrease in D and a concomitant increase in L0 together do explain the three key observations listed above. A 73% decrease in D leads to a 45% decrease in Qapp and shifts the GV to more positive voltages (Fig. 10). A 10-fold increase in L0 accounts for the enhanced open probability, the slower deactivation kinetics, and the longer mean open time at negative voltages (Fig. 10). In addition, the partial charge movement associated with 0-4 is reduced by 50% to account for the reduced voltage dependence of the deactivation time course at very negative voltages. The essential features of the heme action were well simulated using the HCA model by these changes in the following parameters: the allosteric factor D becomes smaller and the equilibrium constant L0 becomes greater (Fig. 10).
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Heme Is Also Effective at Saturating Levels of Ca2+ and Mg2+
The virtual absence of Ca2+ and Mg2+ allowed us to study the effect of heme on the voltage-dependent activation pathway of the Slo1 BK channel in relative isolation. Alternatively, the voltage-dependent gating can be functionally isolated and studied at saturating levels of Ca2+ and Mg2+. In the presence of 120 µM [Ca2+] and 10 mM [Mg2+], which are expected to saturate the high- and low-affinity binding sites for divalent ions (Cox et al., 1997; Zhang et al., 2001
; Zeng et al., 2005
), heme effectively inhibited the currents (Fig. 11 A). As observed in the absence of divalent ions, the tail currents observed with heme saturated following large depolarization (Fig. 11 B). Heme (300 nM) noticeably altered the GV curve (Fig. 11 C); the V0.5 value shifted by 129 ± 9 mV and the Qapp value decreased by 40 ± 5.6% to 0.64 e. The normalized conductance values at 0 mV (Fig. 11 D) indicated that the channels in the presence of heme (300 nM) were less sensitive to high concentrations of divalent cations; increasing [Ca2+] and [Mg2+] to 120 µM and 10 mM, respectively, produced a much smaller increase in the macroscopic conductance when heme was present. Similar inhibitory effects of heme were observed at an intermediate concentration (1 µM) of Ca2+ (unpublished data).
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Simulations of G-V Curves at High Concentrations of Divalent Cations
The HCA model can be extended to account for the channel behavior in the presence of Ca2+ (HA model) (Horrigan and Aldrich, 2002). To simulate the effect of heme on the Slo1 GV curve at the saturating levels of Ca2+ and Mg2+ (Fig. 11), the values of the HCA parameters obtained in the absence of divalent ions were applied to the HA model. Because Mg2+ was not included in the HA model and for the sake of simplicity, the effect of Mg2+ was not considered here. The remaining Ca2+-dependent parameters in the HA model, the Ca2+ binding affinity, the allosteric coupling strength between the channel gate and Ca2+ binding (C), and the allosteric coupling strength between the voltage sensor and Ca2+ binding (E), were initially assumed to be the same in the control and heme conditions, and the values were taken from Horrigan and Aldrich (2002)
. With this assumption, the HA model predicts that heme increases the channel open probability at [Ca2+]i = 120 µM (Fig. 12 A), exactly the opposite of what was experimentally observed (Fig. 11). The discrepancy between the experimental and simulation results suggests that heme may alter other aspects of channel gating in addition to D and L0. Consistent with this possibility, we found that simple decreases in the allosteric coupling strength between the channel gate and Ca2+ binding C and that between the voltage sensor and Ca2+ binding E by the same fraction as used for D (73%) described the effect of heme on the Slo1 GV curve at high [Ca2+], at least qualitatively (Fig. 12 B). The simulated steady-state GV curve in the presence of heme is shifted markedly toward more positive voltages with low as well as high [Ca2+] (Fig. 12), and this is consistent with the experimental results (Fig. 11). It should be noted that the GV shift in high [Ca2+] is strongly influenced by the allosteric factor C but less so by E. Therefore, it is necessary that C be reduced to reproduce the results in Fig. 11. It is possible that E is changed to a lesser extent or even unchanged. However, the experiments necessary to measure E are outside the scope of this study. Similarly, we did not determine whether heme altered the apparent affinity of Ca2+ binding. Such effects, if they occur, are unlikely to account for the reduced response of heme-bound channels to high concentrations of divalent cations in Fig. 11 because the [Ca2+] used (120 µM) was in excess of the normal saturating concentration and channels are still sensitive to low (1 µM) Ca2+ in the presence of heme (not depicted). Thus the effects of heme on the Slo1 channel in the absence of divalent ions is consistent with an increase in the closedopen equilibrium constant L0 and a decrease in the allosteric coupling factor between the channel gate and the voltage sensor D, and the effects at saturating levels of divalent ions require additional decreases in the Ca2+-dependent allosteric coupling factors C and possibly E.
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DISCUSSION |
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Interpretations Using the HCA and HA Models
While the overall effect of heme is largely inhibitory at the voltages where the open probability is appreciable, heme exerts an excitatory effect at more negative voltages; the channel open probability is greater when heme is present. Understanding the complex modulatory effects of heme may be facilitated by using well-developed allosteric models of Slo1 channel gating that describe the channel's response to voltage and divalent cations. Simulations of the ionic currents obtained in the absence of divalent ions using the HCA model (Horrigan et al., 1999) suggest that heme markedly decreases the strength of allosteric coupling between the channel gate and the voltage sensor (D) and shifts the equilibrium between the closed and open states in the absence of voltage sensormediated activation (L0) to the open state. The changes in these parameters in conjunction with a decrease in the partial charge movement associated with
0-4 reproduce the salient characteristics of the properties of the Slo1 channels that open in the presence of heme.
The proposed mechanism of heme action based on the HCA model does not consider the decrease in Gmax (Fig. 6) caused by the blank sweeps in the single-channel data (Fig. 5). Even at very positive voltages with pulses much greater in duration than the macroscopic activation time constant, these blank sweeps are readily observed. They are likely caused by a very slow gating component operating independently of the voltage sensor movement because the total charge movement is only marginally decreased by heme (Fig. 7). The exact nature of this slow gating process and how it relates to the transitions described in the HCA model is not clear. What is certain is that these transitions are not created de novo by heme but their occurrence is drastically increased by heme because a small number of apparent blank sweeps are indeed observed without heme. The channels that do open in the presence of heme kinetically function as a single population, and the contributions from the blanks sweeps and the decrease in Gmax to our modeling and simulation were likely negligible.
The modulatory effects of heme on the Slo1 channel persist at saturating levels of Ca2+ and Mg2+. Ca2+-dependent gating of the Slo1 channel is successfully described by the HA model (Horrigan and Aldrich, 2002), which builds on the HCA model and incorporates Ca2+ as another allosteric dimension. The HA model includes allosteric interactions among the channel gate, voltage sensor, and Ca2+-binding site, and the coupling strengths are described by the parameters C, D, and E. The changes in L0 and D described for the low-Ca2+ condition when incorporated into the HA model do not adequately reproduce the results with high concentrations of divalent cations, suggesting that heme may modulate other functional characteristics of the channel. We find that an across-the-board reduction in C, D, and E by
70% at least qualitatively reproduces the heme effects at high concentrations of divalent cations. The experiments necessary to rigorously estimate C and E are out of the scope of this study, but the possibility that heme may act as a common regulator of allosteric coupling in Slo1 gating suggests that heme may exert its action where the influences of the voltage sensor and divalent cation binding sites converge.
Molecular Mechanism of Heme Action
The biophysical interpretations of heme action on the Slo1 channel using the HCA and HA models may be given a molecular and structural connotation using the high-resolution structure of the prokaryotic MthK channel (Jiang et al., 2002) and the mechanical spring model of Slo1 gating (Niu et al., 2004
). The Ca2+-activated open structure of MthK suggests that the cytoplasmic RCK1 and RCK2 domains in each of the four Slo1 subunits in a channel complex dimerize and that the four RCK dimers in turn form a gating ring structure (Jiang et al., 2002
). The expansion and constriction of the gating ring, caused by changes in the relative positions of the four RCK dimers, are envisioned to contribute to channel opening and closing by exerting force on the activation gate through the S6-RCK1 linker (Jiang et al., 2002
). The idea that the S6-RCK1 linker exerts mechanical tension on the gate is supported by the observation that open probability, whether Ca2+ is absent or present, is drastically influenced by changes in the linker length (Niu et al., 2004
). Based on this observation, Niu et al. proposed a mechanical spring model of Slo1 BK channel activation whereby each subunit component of the channel activation gate, likely the cytoplasmic end of S6, is coupled to the cytoplasmic gating ring and also to S4 via two separate spring-like connectors (Armstrong, 2003
; Niu et al., 2004
). The two separate linkages are required to account for the energetic additivity of voltage and Ca2+ in channel activation (Cui and Aldrich, 2000
). The highly stylized diagrams in Fig. 13 A capture the essence of the mechanical spring model of Niu et al. (2004)
in the absence of Ca2+ while incorporating an additional interaction between the voltage sensor and the gating ring composed of the RCK1/RCK2 domains. The presence of voltage sensor/gating ring interaction is consistent with the findings that mutations in S4 and the S4S5 linker disrupt Mg2+-dependent activation of the channel (Hu et al., 2003
) involving the cytoplasmic RCK1 domain (Shi and Cui, 2001
; Zhang et al., 2001
) and that Mg2+ acts to enhance coupling between voltage sensor activation and channel opening (Horrigan, 2005
). This model will be used to explain how heme binding to the cytosolic gating ring could influence voltage-dependent gating, and it draws on the idea that a portion of the coupling between voltage sensor and gate may be mediated by interaction between the voltage sensor and gating ring (Hu et al., 2003
; Horrigan, 2005
).
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To account for the action of heme, we present the following speculative model that postulates that heme perturbs only the gating ring. We depict heme as binding to the segment between RCK1 and RCK2, altering the structures of the RCK1/RCK2 dimer and of the gating ring (Fig. 13 B). This positioning of heme is consistent with the suggestion by Tang et al. (2003) that heme binding depends on H616 in the RCK1RCK2 linker segment. We suggest that heme binding makes the constricted conformation of the gating ring less constricted/more expanded, increasing tension on the closed gate to increase L0. The expanded state of the gating ring may become less expanded, accounting for a decrease in the response to Ca2+ (smaller C in the HA model) while also preventing the normal interaction between gating ring and voltage sensor (smaller D in the HA model). By acting on the gating ring, heme may thus act as a common regulator of allosteric coupling.
While speculative, the model in Fig. 13 accounts for the experimental findings presented in this study and is consistent with previous results about Slo1 gating. For example, one key observation is that heme has little impact on gating charge movement when the channels are closed (Fig. 7). This is implemented in the model by postulating that the interaction between voltage sensor and gating ring does not occur in the closed state. The model suggests that heme alters the gating ring structure by perturbing the RCK1/RCK2 dimer interface. This need not be the case but is consistent with the observation of Zhang and Horrigan (2005) that modification of C430 near the dimer interface in the RCK1 domain also alters allosteric coupling for both voltage- and Ca2+-dependent activation.
Some details of the interaction between voltage sensor and gating ring in the model depicted in Fig. 13 are not well constrained by the experimental results. For instance, voltage sensor and gating ring may interact in all states so long as heme impacts these interactions in a state-dependent manner. In addition, a decrease in the allosteric factor D together with an increase in open probability at negative voltages (increasing L0) could be produced by strengthening interaction between gating ring and voltage sensor in the OR state rather than weakening interaction in the OA state.
The model proposed in Fig. 13 accounts for heme's action as a common regulator of allosteric coupling by postulating that binding of heme to the RCK1/RCK2 linker segment alters the conformational change of the gating ring. Alternatively, one may postulate that binding of heme acts merely to enhance the tension on the S6-RCK1 linker, perhaps modifying the passive mechanical properties of the gating ring/linker complex (Niu et al., 2004). This greater tautness is expected to increase open probability at negative voltages in the absence of Ca2+, thereby increasing L0 in the HCA model. However, the idea that heme simply increases the tension in the S6-RCK1 linker fails to account for the critical observation that heme modifies voltage-dependent gating, altering the steepness of the GV (Fig. 6). The GV steepness remains unaltered when the tension on the S6-RCK1 linker is changed by insertion/deletion mutations in the S6-RCK1 segment (Niu et al., 2004
).
Physiological Implications
The Slo1 channel is influenced by heme over a broad range of divalent cation concentrations. Therefore, heme is poised to act as a regulator of the channel function under a variety of physiological conditions. Information on dynamic changes in intracellular heme concentrations is not available but it is often speculated that the concentration may increase appreciably following hemorrhaging strokes (Wagner and Dwyer, 2004). Intracellular heme then may bind to Slo1 BK channels, modulating those physiological processes dependent on BK channels, such as vasorelaxation (Patterson et al., 2002
) and oxygen sensing (Williams et al., 2004
). Potential inhibition of BK channels by heme may account for the cerebral vasospasm frequently observed following hemorrhaging strokes (Aihara et al., 2004
). However, the possibility that heme may play a regulatory or compensatory role during these vascular accidents cannot be excluded because heme actually enhances the channel activity at more hyperpolarized, and potentially more physiological, voltages. Future studies using native BK channels should provide further insights.
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ACKNOWLEDGMENTS |
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This work was supported in part by National Institutes of Heath (F. Horrigan and T. Hoshi), American Heart Association (T. Hoshi), and Interdisziplinaeres Zentrum fuer klinische Forschung/Thueringer Ministerium fuer Wissenschaft, Forschung und Kunst B307-04004 (S.H. Heinemann).
David C. Gadsby served as editor.
Submitted: 1 February 2005
Accepted: 13 May 2005
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REFERENCES |
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