INTRODUCTION

TOP ABSTRACT INTRODUCTION MATERIALS AND METHODS RESULTS DISCUSSION APPENDIX REFERENCES

MYOCARDIAL Ca²⁺ handling in excitation-contraction (E-C) coupling determines not only cardiac contractility but also O₂ consumption for the Ca²⁺ handling (30). To quantify the O₂ consumption for Ca²⁺ handling relative to left ventricular contractility in terms of end-systolic pressure-volume ratio (maximum elastance, E_max), we had proposed the O₂ cost of E_max (30). We defined it as the ratio of O₂ consumption for total Ca²⁺ handling, namely, other than contraction and basal metabolism, to E_max (30).

We have attributed an increased O₂ cost of E_max to a decrease in the recirculation fraction (RF) of Ca²⁺ within myocardial cells as well as a decrease in the response of E_max to total released Ca²⁺ (E_max reactivity, R) in canine failing (e.g., stunned and ryanodine-treated) hearts (3, 10, 13, 27). We have separately found that cardiac cooling from 40 to 30°C considerably decreased the O₂ cost of E_max with a temperature sensitivity (Q₁₀) of ~2 in canine hearts (18). However, the underlying mechanisms in the temperature-dependent O₂ cost of E_max remain to be elucidated (18, 24, 31).

Therefore, in the present study, we hypothesized that cardiac temperature would also change either RF or E_max reactivity or both, and thereby change the O₂ cost of E_max. We tested this hypothesis in the canine heart. We used our recently developed method to obtain RF by extracting an exponential decay component from the transient alternans decay of postextrasystolic potentiation (PESP) (3, 10, 13, 16, 19, 26-28). We obtained interesting results to support that the temperature-dependent ATP-consuming activities in Ca²⁺-handling processes could largely account for the temperature-dependent changes in both RF and E_max reactivity, and hence Q₁₀ = 2 of O₂ cost of E_max.

	MATERIALS AND METHODS

TOP ABSTRACT INTRODUCTION MATERIALS AND METHODS RESULTS DISCUSSION APPENDIX REFERENCES

Surgical preparation. We used a standard-type excised, cross-circulated canine heart preparation that we have been consistently using in cardiac mechanoenergetics studies (18, 31). All procedures were conducted in conformity with the "Guiding Principles for Research Involving Animals and Human Beings" endorsed by the American Physiological Society as well as the Physiological Society of Japan. The details of the surgical preparations were described elsewhere (18, 31).

Pacing. We used a fixed pacing stimulus pattern. It consisted of a single extrasystole (ES) inserted at an extrasystolic interval (ESI) of 320 ms after 10 or more regular beat intervals (RIs) of 500 ms (120 beats/min). The first postextrasystolic beat (PES1) interval (PESI1) was 500 ms with no compensatory pause. The 10 or more subsequent PESIs were also 500 ms. We allowed no compensatory pause because we wanted to know how the ESI alone would affect the PESP beats at different LV temperatures. We have already found that even the PESP decay after no compensatory pause in PESI1 contained an alternans decay component, although smaller than after a compensatory pause (26). These pacing stimuli were produced with a stimulator controlled by a computer installed with LabView 3.1 (National Instruments).

Normalized contractility. To evaluate the beat-to-beat changes in LV contractility during each PESP decay, we used E_max (maximum elastance, or end-systolic pressure-volume ratio) as an index of ventricular contractility (30). In isovolumic contractions as we used, end systole corresponds to peak systole. E_max values of PES1-6 were calculated as the ratio of peak isovolumic LVP to LVV minus V₀, identified as the LVV at which peak LVP was zero (30). These E_max values were normalized (nE_max) relative to the E_max of the preceding regular beats. The changes in nE_max values during the PESP decay were therefore proportional to those in the peak LVP values at a fixed LVV.

Curve fitting. We examined whether the obtained nE_max values of PES1-6 during each PESP decay at any LV temperature could be fit by the same equation that we had proposed and used in the previous studies (3, 10, 13, 16, 19, 26-28)

(1)

where nE_max is the normalized contractility of PESi (i = 1-6) relative to the preceding regular beats (Fig. 1, right). Coefficient a is the amplitude constant of the monoexponential decay term (first term). Coefficient b is the amplitude constant of the other exponential term multiplying the sinusoidal decay term (second term). Denominators _e and _s are the beat constants of the first and second exponential terms, respectively. Their unit is the number of beats but not time (such as milliseconds). Subscripts e and s refer to exponential and sinusoidal. Although we used the cosine function in Eq. 1, the term could be any oscillatory or alternating function as long as it fits the discrete PESi data points (11).

View larger version (41K): [in this window] [in a new window]   Fig. 1.   Schematic diagram of Ca2+ handling model. Emax, contractility index; SM, sarcomere; SR, sarcoplasmic reticulum; SL, sarcolemma; RF, recirculation fraction of Ca2+ within myocardial cells; the fraction being sequestered predominantly via SR Ca2+ pump (ATPase) and released via SR Ca2+ channel (upward arrow through SR) in the total Ca2+ handled in excitation-contraction coupling (thick downward arrow between SR and SM). XF = 1  RF, extrusion fraction of Ca2+ predominantly via SL Na+/Ca2+ exchange and auxiliarily via SL Ca2+ pump (ATPase) and entering via SL Ca2+ channel (transsarcolemmal outward and inward arrows). Top right graph depicts an Eq. 1 curve characterizing postextrasystolic alternans decay. Middle right graph depicts exponentially decaying oscillatory component (2nd term) of Eq. 1. Bottom right graph depicts exponentially decaying monotonic component (1st term) of Eq. 1. a, Amplitude constant of the 1st term of Eq. 1; e, beat constant of the 1st term of Eq. 1; b, amplitude constant of the 2nd term of Eq. 1; s, beat constant of the 2nd term of Eq. 1; nEmax, normalized Emax over 1st-6th postextrasystolic beats relative to the preceding regular beat; PESi, postextrasystolic beat number i.

Ca²+ handling model. The conventional, monotonic, or exponential decay of the PESP has been accounted for by the beat-by-beat decreasing Ca²⁺ recruitability in E-C coupling from its transiently augmented level in PES1 toward the steady-state level of regular beats (21, 34, 35). The most potentiated PES1 is due to both an increased transsarcolemmal Ca²⁺ influx and an increased availability of sarcoplasmic reticulum (SR) Ca²⁺ associated with the preceding extrasystole and PESI1 (37). The gradual monotonic decay over the following PES2-6 is due to the transsarcolemmal Ca²⁺ extrusion exceeding the influx and hence the gradually decreasing Ca²⁺ releasability over these beats. Stable regular beats are restored due to the Ca²⁺ homeostasis (3-5, 21).

Recirculation fraction. We calculated RF from the beat constant _e in the first term of Eq. 1 best fit to the alternans decay over PES1-6 (10, 13, 16, 19, 26-28). We considered this RF to be equivalent to the RF obtained from the beat constant  of the conventional monotonic PESP (21, 34) (see APPENDIX). Both quantify the fraction of the total amount of Ca²⁺ handled in E-C coupling that recirculates intracellularly via the SR without being extruded transsarcolemmally. Reciprocally, 1  RF quantifies the fraction of the total amount of Ca²⁺ handled in E-C coupling that is extruded and enters transsarcolemmally, i.e., Ca²⁺ extrusion fraction.

Data analyses. We performed curve fitting of Eq. 1 by the least-squares method using LabView 3.1 (National Instruments) on a computer. We obtained a, b, _e, _s, and RF from the best-fit Eq. 1. We compared them among 33, 36, and 38°C. Goodness of the curve fitting was evaluated by correlation coefficient (r).

Statistics. Best-fit a, b, _e, _s, and RF values were presented as their means ± SD. They were compared among 33, 36, and 38°C by one-way repeated-measures ANOVA. When ANOVA was significant (P < 0.05), we performed multiple comparisons between LV temperature by Bonferroni's test. We considered a P value <0.05 to indicate statistical significance. Correlation coefficient (r) of the curve fitting was obtained in each PESP decay. We used StatView 4.5 (Abacus Concepts; Berkeley, CA) to perform these statistics.

	RESULTS

TOP ABSTRACT INTRODUCTION MATERIALS AND METHODS RESULTS DISCUSSION APPENDIX REFERENCES

PESP decay patterns. Figure 2 depicts a representative set of the PESP decays at 33°C (Fig. 2A), 36°C (B), and 38°C (C) in one heart. Isovolumic LVV during regular beats and each PESP decay was maintained at a relatively small constant volume regardless of LV temperature. The small volume had to be chosen to avoid LVP of PES1 above 200 mmHg at 33°C. This in turn caused a relatively low LVP (50-60 mmHg) in regular beats at 38°C. LVP over 200 mmHg tended to cause spontaneous extrasystoles, and in the worst case, damage the aortic valve resulting in herniation of the intraventricular balloon.

View larger version (28K): [in this window] [in a new window]   Fig. 2.   Representative set of left ventricular (LV) pressure (LVP) tracings of postextrasystolic alternans decays at 33°C (A), 36°C (B), and 38°C (C) in one heart. Regular beat intervals (RIs) were fixed at 500 ms. Extrasystolic beat interval (ESI) was fixed at 320 ms. PESIs were fixed at 500 ms. Isovolumic LV volume in all beats were constant (12.9 ml/100 g LV) regardless of LV temperature.

Curve fitting. Figure 3 depicts a representative set of the alternating curves (solid curves) best fit with Eq. 1 to nE_max (normalized E_max) of PES1-6 (closed circles) at 33°C (Fig. 3A), 36°C (B), and 38°C (C) in one heart. Figure 3 also shows their monoexponential decay terms (first term of Eq. 1, dashed curves) and exponentially decaying sinusoidal terms (second term of Eq. 1, dotted curves). The sinusoidal curves are meaningful only at integer i values corresponding to PES1-6 and meaningless at other noninteger i values (11).

View larger version (26K): [in this window] [in a new window]   Fig. 3.   Three representative best-fit curves (solid). Equation 1 (see MATERIALS AND METHODS) was best fit to the data points (closed circles) for nEmax of 1st-6th PESi (i = 1-6) at 33°C (A), 36°C (B), and 38°C (C) in the same heart shown in Fig. 2, A-C. Best-fit curve consists of an exponentially decaying monotonic component (1st term of Eq. 1, dashed curve) and an exponentially decaying oscillatory component (2nd term of Eq. 1, dotted curve). r, Correlation coefficient.

Amplitude constants a and b. Figure 4, A and B, plots means ± SD values (dimensionless) of amplitude constants a and b of Eq. 1 best fit to the alternans PESPs at 33, 36, and 38°C in the seven hearts. Both a and b decreased significantly with increasing temperature. Figure 4, C and D, plots means ± SD values (dimensionless) of amplitude constant ratios a/(a + b) and b/(a + b). Because a + b is equal to the normalized magnitude of PES1, these ratios mean the fractional magnitudes of a and b in PES1. a/(a + b) increased but b/(a + b) decreased significantly as the temperature increased. These changes were consistent with the visual impression that the alternans as well as its oscillatory component gradually disappeared, and the monoexponential component became dominant as the temperature increased in Figs. 2 and 3.

View larger version (26K): [in this window] [in a new window]   Fig. 4.   Temperature dependence of amplitude constants a (A) and b (B) and their relative magnitudes to a + b, i.e., a/(a + b) (C) and b/(a + b) (D) at 33, 36, and 38°C. Plots show their means ± SD in 7 hearts. *P < 0.05 for significant difference of 38°C vs. 33°C by Bonferroni t-test after one-way repeated-measures analysis of variance.

Beat constants _e and _s. Figure 5, A and B, plots means ± SD values (beats) of beat constants _e and _s of the Eq. 1 best fit to the alternans PESPs at 33, 36, and 38°C in the seven hearts. Both _e and _s decreased significantly with increasing temperature. Multiplication of _e and _s by RI in milliseconds converted these beat constants to time constants in time unit (in ms). Figure 5, C and D, plots means ± SD values (beats) of time constants _e times regular beat interval (RI) and _s times RI. Both time constants decreased significantly with increasing temperature. Because RI was fixed constant at 500 ms in the present study, these changes in time constants happened to be proportional to those in beat constants _e and _s per se.

View larger version (27K): [in this window] [in a new window]   Fig. 5.   Temperature dependence of beat constants e (A) and s (B) and their multiplication with RI, i.e., e × RI (C) and s × RI (D) at 33, 36, and 38°C. Plots show their means ± SD of e, s, e × RIm and s × RI in 7 hearts. *P < 0.05 for significant difference of 36 and 38°C vs. 33°C; **P < 0.005 vs. 33°C by Bonferroni t-test after one-way repeated-measures analysis of variance.

Recirculation fraction. Figure 6A plots RF values (dimensionless) given by exp(1/_e) using _e of Eq. 1 best fit to the alternans decays at 33, 36, and 38°C in the seven individual hearts. This RF = exp(1/_e) is after the method by Morad and Goldman (21). We have confirmed the reliability of this RF calculation by a new discrete fitting method (11). Figure 6B plots their means ± SD values. RF decreased significantly with increasing temperature in every heart as well as on the average after pooling all the hearts. RF decreased by 18% on average from 33°C to 36°C, by 13% on average from 36°C to 38°C, and by 28% on average from 33°C to 38°C.

View larger version (17K): [in this window] [in a new window]   Fig. 6.   RF of Ca2+ within myocardial cells at 33, 36, and 38°C in 7 individual hearts (A) and their means ± SD (B). RF = exp(1/e). *P < 0.05 for significant difference of 36 and 38°C vs. 33°C; **P < 0.005 vs. 33°C by Bonferroni t-test after one-way repeated-measures analysis of variance.

Temperature sensitivity. Table 1 lists Q₁₀ of a, b, _e, _s, RF, and E_max. All the obtained Q₁₀ values were smaller than unity. Therefore, their 1/Q₁₀ values were greater than unity. For example, RF had Q₁₀ = 0.5 and 1/Q₁₀ = 2 on average. Similarly, E_max of regular beats had Q₁₀ = 0.6 and 1/Q₁₀ = 1.7. 

View this table: [in this window] [in a new window]   Table 1.   Q10 of a, b, e, s, RF, and Emax

	DISCUSSION

TOP ABSTRACT INTRODUCTION MATERIALS AND METHODS RESULTS DISCUSSION APPENDIX REFERENCES

Postextrasystolic alternans decay. The present result on E_max confirmed the temperature dependence of E_max of regular beats preceding PESP that we have reported previously (18, 24, 31). Q₁₀ of E_max in the present study (Table 1) was similar to 0.44 ± 0.13 for 30-40°C in our previous study (18).

_e, _s, and RF. In our Ca²⁺ handling model (Fig. 1) (3, 10, 13, 16, 19, 26-28), _e of the monotonic decay component of the transient alternans PESP reflects essentially the same RF as  of the monotonic PESP decay does (11, 21, 34, 35) (see APPENDIX). The present study revealed that _e and RF decreased with increasing temperature. Note, however, that we kept RIs and PESIs constant regardless of the temperature changes. Therefore, _e times RI, which has time units, also decreased in proportion to _e with increasing temperature. Therefore, _e times RI and _e alone have the same Q₁₀, although their dimensions are different. Their Q₁₀ (<1) and 1/Q₁₀ (>1) suggest temperature accelerated chemical reactions behind the smaller RF.

Cooling inotropism. The present Q₁₀ = 0.6 for E_max is consistent with our previous results (18, 24, 31). However, O₂ consumption for total Ca²⁺ handling is temperature independent (18, 24, 31). This leads to the temperature-dependent O₂ cost of E_max with Q₁₀ = 2 (18, 24, 31).

Ca²+ and ATP consumption. A change in RF affects ATP consumption for myocardial total Ca²⁺ handling according to the different energy cost between the major internal and external Ca²⁺ handling routes (25, 31). The internal Ca²⁺ handling route via the SR is nominally twice more economical than the transsarcolemmal route (4, 27, 33).

RF versus O₂ cost of E_max. Although the present Q₁₀ = 0.5 of RF is inversely proportional to the previous Q₁₀ = 2 of O₂ cost of E_max (18), this does not immediately mean that the latter is fully accountable by the former. Table 2 lists the equations relating total Ca²⁺ handling, its O₂ consumption (its O₂, or total Ca²⁺ handling O₂), RF, and E_max (3, 27). Equation A in Table 2 is the stoichiometric equation relating total Ca²⁺ handling, its O₂, and RF. Equation B defines the reactivity (R) of E_max to total Ca²⁺ handling. The substitution of Eq. B into Eq. A yields Eq. C after conversion of the dimensions of O₂ (from µmol/kg into ml O₂/100 g). Equation D defines the O₂ cost of E_max. The substitution Eq. D into Eq. C yields Eq. E. It relates O₂ cost of E_max with RF and R. 

View larger version (21K): [in this window] [in a new window]   Fig. 7.   Theoretical relations between recirculation fraction of Ca2+ within myocardial cells (RF) and O2 cost of Emax with reactivity of Emax to Ca2+ handling (R) as a parameter (Eq. E in Table 2). Four slant lines indicate these relations. Heavy steeper line represents the actually observed changes of O2 cost of Emax with Q10 of 2 in our previous study (Ref. 18). Vertical dashed lines are drawn at the two RF values for 33 and 38°C. Intersections (open circles) of these vertical lines with the heavy line are the reasonable O2 cost of Emax-RF-R working points at 33 and 38°C. For more details, see RF versus O2 cost of Emax in DISCUSSION.

Limitations. The present model of total Ca²⁺ handling has a limitation. Our Ca²⁺ handling model combines the oscillatory component of the SR Ca²⁺ handling with the Morad and Goldman model (21). Their model assumes that SR has little delay in the availability of sequestered Ca²⁺ for the next release (21). This holds as long as the mechanical restitution is fully recovered, namely, after a relatively long beat interval (37). However, beat intervals even without pacing in the present heart preparation are too short for the full recovery of mechanical restitution (20). This seems to generate the oscillatory component on top of the exponential decay (20) (see APPENDIX).