INTRODUCTION

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES APPENDIX

THE SPATIAL DISTRIBUTION of blood flow into the coronary capillaries has obvious physiological significance because the nutrition of the heart muscle depends on the blood flow in the capillaries. Our hypothesis is that the branching pattern and vascular geometry of the coronary capillary network are important determinants of coronary capillary blood flow that, in turn, influence the transport of oxygen and nutrients to the myocardium. We have previously stressed that the topological structure of the coronary arteries and intramyocardial veins are treelike but that the coronary capillary blood vessels have a non-treelike topology (9-11). The capillaries not only branch but also cross-connect along their lengths (9). The presence of cross-connections in the myocardial capillaries may make the pressure and flow distributions in the capillary bed more uniform.

A network simulation of the coronary capillary blood flow has been previously done by Wieringa et al. (25) in a model of hexagonally stacked parallel capillaries with randomly distributed interconnections based on the experimental data of Bassingthwaighte et al. (2). Wieringa et al. (25) assumed that all capillaries have uniform diameter and obey a linear pressure-flow relationship that did not take into account the capillary distensibility and the non-Newtonian blood rheology.

We wanted to improve the existing analysis of the coronary capillary blood flow in four ways: 1) use the topology and vascular dimensions of the coronary capillary network as determined by morphometry; 2) measure the compliance or distensibility of the coronary capillaries and use the results in the network analysis; 3) incorporate the non-Newtonian blood rheology in the analysis; and 4) embed the capillary networks between coronary arterial and venous trees realistically according to morphometric data. With regard to 1 and 4 above, we refer to our previously measured morphometric data (9). With regard to 3 above, we refer to the work of Lingard (13), Lipowsky et al. (14), and Pries et al. (15). For 2 above, a new morphometric study on the distensibility of epicardial capillaries of the pig left ventricle at the diastolic state is described here. With these data we can use the laws of physics (conservation of mass and momentum) and the appropriate boundary conditions to formulate well-posed boundary value problems for the hemodynamics of the coronary capillary network. Extension to systolic state and the beating heart awaits future work. In the context of the present analysis, our main goals are to determine the effect of capillary cross-connections and the elasticity of vessels on the pressure and flow distributions in the coronary capillary network.

	METHODS

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES APPENDIX

Isolated heart preparation. The studies were performed on healthy farm pigs weighing 28-32 kg. Surgical anesthesia was induced with ketamine (33 mg/kg im) and atropine (0.05 mg/kg im) and maintained with pentobarbital sodium (30 mg/kg iv, in an ear vein). A midline sternotomy was performed, ventilation with room air was provided with a respiratory pump, and anticoagulation was induced with heparin (100 U/kg). An incision was made in the pericardium, and the heart was supported in a pericardial cradle. The heart was arrested with a saturated KCl solution given through a jugular vein. The heart was then excised, with the ascending aorta clamped to keep air bubbles out of the coronary vessels, and placed in a cold (0°C) saline bath. The right coronary artery, left anterior descending coronary artery (LAD), left circumflex artery (LCX), and coronary sinus artery (CS) were cannulated under saline to avoid air bubbles. These coronary arteries were then immediately perfused with an isosmotic, cardioplegic rinsing solution as described in Kassab et al. (11) to maintain the myocardium relaxed and the vasculature vasodilated.

Pressure-diameter relationship. To examine the distensibility of the epicardial surface capillaries, the surface of the isolated heart preparation was transilluminated and viewed with an intravital microscope. The coronary arteries were perfused with a colored microfil (inert, fluid silicone) to visualize the epicardial surface microvessels. The silicone microfil is a water-immiscible, long-chain polymeric material that does not extravasate the vessel. Also, no catalyst was added to the microfil polymer, so it remained a viscous fluid throughout the experiment. Once the microfil was observed in the CS and in the heart chambers, fast-hardening, catalyzed microfil (curing time 3-5 min) was poured into the heart chambers. The cast chambers seal off any arterial luminal or Thebesian drainage. Hence, the pressure was regulated in the entire vasculature by clamping off the CS and establishing a static pressure throughout the vasculature. Epicardial surface capillaries were identified and their elastic pressure-diameter relationship determined. Initially, the vessels were preconditioned with loading and unloading pressure ramps over several cycles. Subsequently, images were recorded in the pressure range from 0 to 60 mmHg in increments of 10 mmHg for the capillaries. Typical images of the coronary epicardial surface vessels perfused with microfil are shown in Kassab et al. (10). Diameter measurements were made using a ×40 objective (NA = 0.77) with a resolution of 0.5 µm. An image grabber was used to grab the frames of a given capillary vessel at different pressures. The images were stored on a video floppy disk and analyzed at a later time. The grabbed frames were input into our image processing system, where the diameters of the vessels were digitized. The mean diameter, for each pressure, was computed from several diameter measurements made over a 20- to 30-µm length of the capillary vessel.

	RESULTS

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES APPENDIX

Compliance of capillary vessels. Figure 1A shows the pressure-diameter relationship of the 12 capillary vessels measured at the epicardial surface from 3 pig hearts (4 vessels from each heart). The measurements were made at the base of the heart near the LAD-LCX artery bifurcation. Figure 1B shows that, in the pressure range (10-50 mmHg), the elastic deformation can be described by the equation

(1)

where D is the diameter at a given intravascular pressure P, D* is the diameter corresponding to the physiological pressure P* (30 mmHg), and  is the compliance constant of the vessel. The mean ± SD of  over the 12 measurements was found to be 1.7 ± 0.91 × 10⁶ cm/mmHg by a linear least-squares fit of the data with the intercept set at zero, as shown in Fig. 1B, in the 10-50 mmHg pressure range with a mean correlation coefficient of 0.92. 

View larger version (21K): [in this window] [in a new window]   Fig. 1.   A: pressure-diameter relationship for 12 capillary vessels measured at epicardial surface. B: relationship between pressure (P) minus physiological pressure (P*, 30 mmHg) and diameter (D) minus diameter at physiological pressure (D*) for the 12 capillary vessels in A.

Simulation analysis of coronary capillary blood flow based on morphometric, rheological, and compliance data. Kassab and Fung (9) designated all capillaries as blood vessels of order number zero; we further designated the capillaries as those fed directly by arterioles (C_0a), those drained directly into venules (C_0v), and those connected to C_0a and C_0v (C₀₀). The capillaries branch in patterns identified as Y, T, H, or HP (hairpin) on the basis of their geometric shape and anastomose through capillary cross-connections (C_cc) (2, 9). The C_cc vessels may connect adjacent capillaries or capillaries originating from different arterioles. A branching pattern of the coronary capillary bed was constructed on the basis of these patterns (the frequency of Y, T, H, and HP patterns simulated the measurements in Ref. 9), whereas the vascular dimensions (diameters and lengths) were prescribed by the morphometric data of Kassab and Fung (9). An idealized case is shown in Fig. 2.

View larger version (26K): [in this window] [in a new window]   Fig. 2.   A schematic of an idealized capillary network. Asterisk indicates capillaries that connect to capillary vessels above and below the capillary plane.

(2)

(3a)

1

1

(3b)

1

(4a)

1

(4b)

1

Effect of C_cc on the hemodynamics of the capillary network. To examine the effect of C_cc on the pressure and flow distributions in the capillary bed, we assumed that the compliance was zero ( = 0) and considered a special case of Eq. 4. The problem was formulated as follows. In a network of capillaries (see example in Fig. 2), the nodes were numbered as 1, 2, ..., M. In a vessel connecting two nodes represented as i and j, the flow from node i to node j was denoted as Q_ij, whereas the differential of pressures at nodes i and j was denoted as P_ij. The pressure-flow relationship was then written as

(5)

where
and
is a quantity called the vascular conductance of the vessel ij, which is a function of D_ij, L_ij, and U_ij, the diameter, length, and velocity, respectively, between nodes i and j. The expression for µ_{app ij} is given by Eq. 3.

(6)

(7)

(8a)

(8b)

View larger version (18K): [in this window] [in a new window]   Fig. 3.   Log-transformed, median-normalized flow distributions in capillaries fed directly by arterioles (C0a; A), capillaries connected to C0a and C0v (C00; B), capillaries drained directly into venules (C0v; C) and capillary cross-connections (Ccc; D). Q0a, Q00, Q0v, and Qcc, flow in C0a, C00, C0v, and Ccc, respectively; Qmedian, median flow.

View larger version (21K): [in this window] [in a new window]   Fig. 4.   A: relationship between median flow per capillary segment and capillary order number, with and without Ccc. B: relationship between coefficient of variance (CV; SD/mean, %) of blood flow and capillary order number, with and without Ccc.

View larger version (20K): [in this window] [in a new window]   Fig. 5.   A: relationship between median pressure drop (P) per capillary segment and capillary order number, with and without Ccc. B: relationship between CV of pressure drop and capillary order number, with and without Ccc.

View larger version (14K): [in this window] [in a new window]   Fig. 6.   Relationship between median total flow into capillary network (QTin) and number of Ccc. Flow is normalized with respect to QTin with presence of all Ccc.

View larger version (15K): [in this window] [in a new window]   Fig. 7.   Relationship between median flow velocity per capillary segment and capillary order number, with and without Ccc.

Effect of vessel compliance on the hemodynamics of the capillary network. With the distensibility of the blood vessels known, the mechanics of the blood vessel were coupled to the mechanics of blood flow to yield a pressure-flow relationship for each vessel segment. This can be demonstrated as follows. In a stationary, nonpermeable tube, Q is a constant throughout the length of the tube, whereas the tube diameter and the apparent coefficient of viscosity are functions of x because of the elastic deformation. The elastic deformation of the coronary capillaries can be described by Eq. 1, which can be differentiated to yield

(9)

By substituting Eq. 9 into Eq. 2 and assuming µ_app to be a constant for each individual order (5.7 cP for the order C_0a, 5.0 cP for C₀₀, 5.5 cP for C_0v, and 5.1 cP for C_cc as the computed medians from our model), we obtained

(10)

Because the right-hand term is a constant independent of x, we obtained the integrated result

(11)

The integration constant is determined by the boundary condition stating that when x = 0, D(x) = D(0). Solving Eq. 2 for P(x) with D = D(x) given by Eq. 11 yielded a nonlinear pressure-flow relationship for each capillary segment that takes the form (see APPENDIX)

(12)

where P^p is Poiseuille's pressure drop as given by Eq. 2 and n is the order number of the capillary. Equation 12 can be used instead of Poiseuille's law (Eq. 2) in the various segments to synthesize the pressure and flow distributions in the capillary network.

	DISCUSSION

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES APPENDIX

Effect of C_cc on the hemodynamics of the capillary network. One of the main goals of the present study was to examine the effect of C_cc on the pressure and flow distributions in the capillary network. We investigated this aspect by constructing a typical capillary network based on measured branching pattern and vascular geometry (diameters and lengths) and applied the laws of physics and the appropriate boundary conditions to analyze the pressure and flow distributions with and without C_cc. C_cc were removed from the network by setting their conductances equal to zero. Our results show that the median flow and pressure drop increased in the presence of C_cc, as shown in Figs. 4A and 5A. The total flow into the capillary network also increased in the presence of C_cc, as shown in Fig. 6. The increase in total flow occurred for the same pressure drop across the capillary network. Hence, the resistance to flow was decreased by the presence of C_cc. Furthermore, C_cc also homogenized the flow and pressure distributions. Figures 4B and 5B show that the relative dispersion (or CV) of flow and pressure drop was reduced in the presence of C_cc. Although these dispersions were reduced in the presence of C_cc, the dispersions at the venous capillaries were still greater than those at the arterial capillaries, that is, the capillary outlet flow and pressure are more heterogeneous than the inlet flow and pressure with or without C_cc. This result may stem from the fact that the number of venous capillaries is greater than the number of arterial capillaries (10). Hence, an increase in the number of possible pathways may lead to an increase in the variability of the hemodynamic parameters.

Effect of vessel compliance on the hemodynamics of the capillary network. The pressure drop in Eq. 12 can be plotted as a function of the compliance  for the various orders of capillary vessels as shown in Fig. 8. When the compliance is zero (rigid vessel), the pressure drop corresponds to that given by Poiseuille's equation. However, when the compliance is nonzero, the pressure drop is smaller than that given by Poiseuille's equation and varies for the different orders of capillary vessels. For our measured values of compliance (7.2 × 10⁷-3.5 × 10⁶ cm/mmHg), the pressure drop predicted by Eq. 12 is nearly equal to Poiseuille's pressure drop as shown in Fig. 8. Hence, we concluded that the effect of epicardial surface capillary compliance on the hemodynamics of the capillary network is negligible in the physiological range of pressures. However, these are only the epicardial surface vessels, and it is unknown whether the intramyocardial vessels are equally stiff.

View larger version (14K): [in this window] [in a new window]   Fig. 8.   Relationship between pressure drop per vessel segment (P) and logarithm of compliance constant for various orders of capillary vessels. Pressure drop is normalized with respect to Poiseuille's pressure drop (Pp).

Comparison with other capillary distensibility data. The distensibility of capillary blood vessels was previously determined using several methods: airtight pressure chamber for the bat wing (4), microannulation and injection of oil drops (23), microocclusion within the limits of a pulse pressure range (18), and elastomer perfusion under known hydrostatic pressures (20). Table 1 summarizes the data for the distensibility of the capillary vessels in various organs and species. It can be seen that the epicardial coronary capillaries are among the least distensible vessels in various organs. Unlike coronary and systemic capillaries, pulmonary capillaries are very distensible because they receive little support from the surrounding tissues (6).

Model limitations. Although our analysis is based on measured morphometric and elasticity data for coronary capillary blood vessels, there were still a number of assumptions made. For example, the distensibility data were obtained from the epicardial surface only because intramural vessels could not be readily visualized with the present technique. Furthermore, the topology of the capillary branching at the epicardial surface is different from that of intramural layers, where the morphometric data were measured. Hence, we combined morphometric data from intramural capillaries with distensibility data from epicardial surface capillaries. Furthermore, we did not measure the distensibility of various orders of capillaries. The findings in the bat wing suggest the existence of a longitudinal gradient of distensibility in the capillary compartment (3). We also restricted our hemodynamic analysis to the diastolic state of the myocardium. Hence, we did not consider the muscle-vessel interaction that is very important in systole. Muscle tension and contraction may have a large effect on capillary diameters and may change the capillary transmural pressure so that the pressure-diameter relationship shown in Fig. 1 is no longer applicable. Furthermore, we did not consider the time-varying vasoactive components of the arterioles that would make the boundary conditions time dependent. These important effects of muscle-vessel interactions must be investigated in the future. The present approach is only a logical first step.