动脉分叉的数学模型

Q3 Mathematics Ural Mathematical Journal Pub Date : 2019-07-25 DOI:10.15826/UMJ.2019.1.011

G. Zavorokhin

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引用次数: 0

摘要

提出了一种动脉分叉的渐近模型。我们提出了一种简单的近似计算压降矩阵的方法。该矩阵的条目包含在修正的传输条件中，该条件由Kozlov和Nazarov早些时候引入，与经典的Kirchhoff条件相比，它可以更好地通过动脉分叉附近的一维流动近似三维流动。本模型考虑了启发式默里三次定律。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A Mathematical Model of an Arterial Bifurcation

An asymptotic model of an arterial bifurcation is presented. We propose a simple approximate method of calculation of the pressure drop matrix. The entries of this matrix are included in the modified transmission conditions, which were introduced earlier by Kozlov and Nazarov, and which give better approximation of 3D flow by 1D flow near a bifurcation of an artery as compared to the classical Kirchhoff conditions. The present modeling takes into account the heuristic Murrey cubic law.

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