Abstract
Solid tumors consist of a porous interstitium and a neoplastic vasculature composed of a network of capillaries with highly permeable walls. Blood flows across the vasculature from the arterial entrance point to the venous exit point, and enters the tumor by convective and diffusive extravasation through the permeable capillary walls. In this paper, an integrated theoretical model of the flow through the tumor is developed. The flow through the interstitium is described by Darcy's law for an isotropic porous medium, the flow along the capillaries is described by Poiseuille's law, and the extravasation flux is described by Starling's law involving the pressure on either side of the capillaries. Given the arterial, the venous, and the ambient pressure, the problem is formulated in terms of a coupled system of integral and differential equations for the vascular and interstitial pressures. The overall hydrodynamics is described in terms of hydraulic conductivity coefficients for the arterial and venous flow rates whose functional form provides an explanation for the singular behavior of the vascular resistance observed in experiments. Numerical solutions are computed for an idealized case where the vasculature is modeled as a single tube, and charts of the hydraulic conductivities are presented for a broad range of tissue and capillary wall conductivities. The results in the physiological range of conditions are found to be in good agreement with laboratory observations. It is shown that the assumption of uniform interstitial pressure is not generally appropriate, and predictions of the extravasation rate based on it may carry a significant amount of error. © 2003 Biomedical Engineering Society.
PAC2003: 8719Tt, 8710+e
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REFERENCES
Apelblat, A., A. Katzir-Katchalsky, and A. Silberberg. A mathematical analysis of capillary-tissue fluid exchange. Biorheology11:1–49, 1974.
Baish, J. W., P. A. Netti, and R. K. Jain. Transmural coupling of fluid flow in microcirculatory network and interstitium in tumors. Microvasc. Res.53:128–141, 1997.
Baish, J. W., and R. K. Jain. Fractals and cancer. Cancer Res.60:3683–3688, 2000.
Baxter, L. T., and R. K. Jain. Transport of fluid and macromolecules in tumors I. Role of interstitial pressure and convection, Microvasc. Res.37:77–104, 1989.
Baxter, L. T., and R. K. Jain. Transport of fluid and macromolecules in tumors II. Role of heterogeneous perfusion and lymphatics. Microvasc. Res.40:246–263, 1990.
Blake, T. R., and J. F. Gross. Analysis of coupled intra-and extraluminal flows for single and multiple capillaries. Math. Biosci.59:173–206, 1982.
Boucher, Y., L. T. Baxter, and R. K. Jain. Interstitial pressure gradients in tissue-isolated and subcutaneous tumors: Implications for therapy. Cancer Res.50:4478–4484, 1990.
Boucher, Y., and R. K. Jain. Microvascular pressure is the principal driving force for interstitial hypertension in solid tumors: Implications for vascular collapse. Cancer Res.52:5110–5114, 1992.
El-Kareh, A. W., and T. W. Secomb. Effect of increasing vascular hydraulic conductivity on delivery of macromolecular drugs to tumor cells. Int. J. Radiat. Oncol., Biol., Phys.32:1419–1423, 1995.
El-Kareh, A. W., and T. W. Secomb. Theoretical models for drug delivery to solid tumors. Crit. Rev. Biomed. Eng.25:503–571, 1997.
Fleischman, G. J., T. W. Secomb, and J. F. Gross. Effect of extravascular pressure gradients on capillary fluid exchange. Math. Biosci.81:145–164, 1986.
Fleischman, G. J., T. W. Secomb, and J. F. Gross. The interaction of extravascular pressure fields and fluid exchange in capillary networks. Math. Biosci.82:141–151, 1986.
Gazit, Y., J. W. Baish, N. Safabakhsh, M. Leunig, L. T. Baxter, and R. K. Jain. Fractal characteristics of tumor vascular architecture during tumor growth and regression. Microcirculation (Philadelphia)4:395–402, 1997.
Gullino, P., and F. Grantham. Studies on the exchange of fluids between host and tumor. I. A method for growing “tissue-isolated” tumors in laboratory animals. J. Natl. Cancer Inst.27:679–693, 1961.
Gutmann, R., J. Launig, A. E. Feyh, K. Goetz, E. Messmer, E. Kastenbauer, and R. K. Jain. Interstitial hypertension in head and neck tumors in patients: Correlation with tumor size. Cancer Res.52:1993–1995, 1992.
Hsu, R., and T. W. Secomb. A Green's function method for analysis of oxygen delivery to tissue by microvascular networks. Math. Biosci.96:61–78, 1989.
Jain, R. K. Transport of molecules in the tumor interstitium: A review. Cancer Res.47:3039–3051, 1987.
Jain, R. K. Determinants of tumor blood flow: A review. Cancer Res.48:2641–2658, 1988.
Jain, R. K. Transport of molecules, particles, and cells in solid tumors. Annu. Rev. Biomed. Eng.1:241–263, 1999.
Jain, R. K., and L. T. Baxter. Mechanisms of heterogeneous distribution of monoclonal antibodies and other molecules in tumors: Significance of interstitial pressure. Cancer Res.48:7022–7032, 1988.
Less, J. R., T. C. Skalak, E. M. Sevick, and R. K. Jain. Microvascular architecture in a mammary carcinoma: branching patterns and vessel dimensions. Cancer Res.51:265–273, 1991.
Milosevic, M. F., A. W. Fyles, and R. P. Hill. The relationship between elevated interstitial fluid pressure and blood flow in tumors: A bioengineering analysis. Int. J. Radiat. Oncol., Biol., Phys.43:1111–1123, 1999.
Netti, P. A., S. Roberge, Y. Boucher, L. T. Baxter, and R. K. Jain. Effect of transvascular fluid exchange on pressure-flow relationship in tumors: A proposed mechanism for tumor blood flow heterogeneity. Microvasc. Res.52:27–46, 1996.
Pozrikidis, C. Introduction to Theoretical and Computational Fluid Dynamics. New York: Oxford University Press, 1997.
Pozrikidis, C. Numerical Computation in Science and Engineering. New York: Oxford University Press, 1998.
Sands, H., P. L. Jones, S. A. Shah, D. Palme, R. L. Vessella, and B. M. Gallagher. Correlation of vascular permeability and blood flow with monoclonal antibody uptake by human clouser and renal cell xenografts. Cancer Res.48:188–193, 1988.
Secomb, T. W., and R. Hsu. Simulation of O2 transport in skeletal muscle: Diffusive exchange between arterioles and capillaries. Am. J. Physiol.267:H1214–H1221, 1994.
Secomb, T. W., R. Hsu, E. T. Ong, J. F. Gross, and M. W. Dewhirst. Analysis of the effects of oxygen supply and demand on hypoxic fraction in tumors. Acta Oncol.34:313–316, 1995.
Secomb, T. W., R. Hsu, M. W. Dewhirst, B. Klitzman, and J. F. Gross. Analysis of oxygen transport to tumor tissue by microvascular networks. Int. J. Radiat. Oncol., Biol., Phys.25:481–489, 1993.
Secomb, T. W., R. Hsu, N. B. Beamer, and B. M. Coull. Theoretical simulation of oxygen transport to brains by networks of microvessels: Effects of oxygen supply and demand on tissue hypoxia. Microcirculation (Philadelphia)7:237–247, 2000.
Sevick, E. M., and R. K. Jain. Geometric resistance to blood flow in solid tumors perfused: Effects of tumor size and perfusion pressure. Cancer Res.49:3506–3512, 1989.
Sevick, E. M., and R. K. Jain. Geometric resistance to blood flow in solid tumors perfused: Effect of hematocrit on intratumor blood viscosity. Cancer Res.49:3513–3519, 1989.
Sevick, E. M., and R. K. Jain. Measurement of capillary filtration coefficient in a solid tumor. Cancer Res.51:1352–1355, 1991.
Vaughan, A. T. M., P. W. Anderson, P. Dykes, C. E. Chapman, and A. R. Bradwell. Limitations to the killing of tumours using radiolabelled antibodies. Br. J. Radiol.60:567–578, 1987.
Zhang, X.Y., J. Lick, M. W. Dewhirst, and F. Yuan. Interstitial hydraulic conductivity in a fibrosarcoma. Am. J. Physiol.279:H2726–H2734, 2000.-
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Pozrikidis, C., Farrow, D.A. A Model of Fluid Flow in Solid Tumors. Annals of Biomedical Engineering 31, 181–194 (2003). https://doi.org/10.1114/1.1540103
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DOI: https://doi.org/10.1114/1.1540103