Litcius/Paper detail

One-Dimensional Blood Flow with Discontinuous Properties and Transport: Mathematical Analysis and Numerical Schemes

Alessandra Spilimbergo, Eleuterio F. Toro, Lucas O. Müller

2021Communications in Computational Physics15 citationsDOI

Abstract

In this paper we consider the one-dimensional blood flow model with discontinuous mechanical and geometrical properties, as well as passive scalar transport, proposed in [E.F. Toro and A. Siviglia. Flow in collapsible tubes with discontinuous mechanical properties: mathematical model and exact solutions. Communications in Computational Physics. 13(2), 361-385, 2013], completing the mathematical analysis by providing new propositions and new proofs of relations valid across different waves. Next we consider a first order DOT Riemann solver, proposing an integration path that incorporates the passive scalar and proving the well-balanced properties of the resulting numerical scheme for stationary solutions. Finally we describe a novel and simple well-balanced, second order, non-linear numerical scheme to solve the equations under study; by using suitable test problems for which exact solutions are available, we assess the well-balanced properties of the scheme, its capacity to provide accurate solutions in challenging flow conditions and its accuracy.

Topics & Concepts

MechanicsFlow (mathematics)Computer scienceStatistical physicsApplied mathematicsPhysicsMathematicsDifferential Equations and Boundary ProblemsStochastic processes and financial applicationsDifferential Equations and Numerical Methods