A Multiscale Framework for Defining Homeostasis in Distal Vascular Trees: Applications to the Pulmonary Circulation [article]

Vasilina Filonova, Hamidreza Gharahi, Nitesh Nama, Seungik Baek, and C. Alberto Figueroa
2020 arXiv   pre-print
Coupling hemodynamics with vessel wall growth and remodeling (G&R) is crucial for understanding pathology at distal vasculature to study progression of incurable vascular diseases, such as pulmonary arterial hypertension. The present study is the first modeling attempt that focuses on defining homeostatic baseline values in distal pulmonary vascular bed via, a so-called, homeostatic optimization. To define the vascular homeostasis and total hemodynamics in the vascular tree, we consider two
more » ... -scales: a cardiac cycle and a longer period of vascular adaptations. An iterative homeostatic optimization is performed at the slow-time scale and incorporates: an extended Murray's law, wall metabolic cost function, stress equilibrium, and hemodynamics. The pulmonary arterial network of small vessels is represented by a fractal bifurcating tree. The pulsatile blood flow is described by a Womersley's deformable wall analytical solution. A vessel wall mechanical response is described by the constrained mixture theory for an orthotropic membrane and then linearized around mean pressure. Wall material parameters are characterized by using available porcine pulmonary artery experiments and human data from literature. Illustrative examples for symmetric and asymmetric fractal trees are presented to provide homeostatic values in normal subjects. We also outline the key ideas for the derivation of a temporal multiscale formalism to justify the proposed one-way coupled system of governing equations and identify the inherent assumptions. The developed framework demonstrates a potential for advanced parametric studies and future G&R and hemodynamics modeling in pulmonary arterial hypertension.
arXiv:2001.04880v1 fatcat:b3tnpul3trhp5kejy3jnkyt4ny