We compare the solutions of two systems of partial differential equations (PDEs), seen as two different interpretations of the same model which describes the formation of complex biological networks. Both approaches take into account the time evolution of the medium flowing through the network, and we compute the solution of an elliptic-parabolic PDE system for the conductivity vector m, the conductivity tensor C and the pressure p. We use finite differences schemes in a uniform Cartesian grid in a spatially two-dimensional setting to solve the two systems, where the parabolic equation is solved using a semi-implicit scheme in time. Since the conductivity vector and tensor also appear in the Poisson equation for the pressure p, the elliptic...
The aim of this study is to conduct a numerical investigation into mathematical models representing ...
The aim of this work is to compare a new uncoupled solver for the cardiac Bidomain model with a usua...
The basic investigation is the existence and the (numerical) observability of propagating fronts in ...
We compare the solutions of two systems of partial differential equations (PDE), seen as two differe...
International audienceWe present new analytical and numerical results for the elliptic-parabolic sys...
We present an overview of recent analytical and numerical results for the elliptic–parabolic system ...
International audienceMotivated by recent physics papers describing rules for natural network format...
International audienceImplicit and semi-implicit time discretizations are developed for the Cai-Hu m...
summary:Modeling the movement of cells (bacteria, amoeba) is a long standing subject and partial dif...
AbstractWe study a coupled system of ordinary differential equations and quasilinear hyperbolic part...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
Boundary value problems in PDEs usually require determination of the eigenvalues and Fourier coeffic...
Abstract:- We give a highly efficient, accurate and unconditionally stable algorithm to solve the pa...
We present a model for biological network formation originally introduced by Cai and Hu [Adaptation ...
In the deterministic continuum modelling of biofilms arise systems of degenerate parabolic equations...
The aim of this study is to conduct a numerical investigation into mathematical models representing ...
The aim of this work is to compare a new uncoupled solver for the cardiac Bidomain model with a usua...
The basic investigation is the existence and the (numerical) observability of propagating fronts in ...
We compare the solutions of two systems of partial differential equations (PDE), seen as two differe...
International audienceWe present new analytical and numerical results for the elliptic-parabolic sys...
We present an overview of recent analytical and numerical results for the elliptic–parabolic system ...
International audienceMotivated by recent physics papers describing rules for natural network format...
International audienceImplicit and semi-implicit time discretizations are developed for the Cai-Hu m...
summary:Modeling the movement of cells (bacteria, amoeba) is a long standing subject and partial dif...
AbstractWe study a coupled system of ordinary differential equations and quasilinear hyperbolic part...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
Boundary value problems in PDEs usually require determination of the eigenvalues and Fourier coeffic...
Abstract:- We give a highly efficient, accurate and unconditionally stable algorithm to solve the pa...
We present a model for biological network formation originally introduced by Cai and Hu [Adaptation ...
In the deterministic continuum modelling of biofilms arise systems of degenerate parabolic equations...
The aim of this study is to conduct a numerical investigation into mathematical models representing ...
The aim of this work is to compare a new uncoupled solver for the cardiac Bidomain model with a usua...
The basic investigation is the existence and the (numerical) observability of propagating fronts in ...