This paper is concerned with the numerical solution of parabolic equations coupled to gradient equations. The gradient equations are ordinary differential equations whose solutions define positions of particles in the spatial domain of the parabolic equations. The vector field of the gradient equations is determined by gradients of solutions to the parabolic equations. Such mixed parabolic-gradient systems are for example used in neurobiological studies of the formation of axonal connections in the nervous system. We discuss a numerical approach for solving parabolic-gradient systems on a grid. The basic ingredients are 4th-order spatial finite-differencing for the parabolic equations, piecewise cubic Hermite interpolation for approximating...
AbstractThe FORTRAN program RKC is intended for the time integration of parabolic partial differenti...
AbstractNew types of split linear multistep methods (SLMMs) are applied to the numerical solution of...
In this paper we introduce a new, simple and efficient numerical scheme for the implementation of th...
AbstractThis paper is concerned with the numerical solution of parabolic equations coupled with grad...
and their applications. SMC is sponsored by the Netherlands Organization for Scientific Research (NW...
In the current paper a numerical approach is presented for solving a system of coupled gradient-diff...
AbstractA numerical comparison is made between three integration methods for semi-discrete parabolic...
summary:We develop gradient schemes for the approximation of the Perona-Malik equations and nonlinea...
Splitting methods are widely used temporal approximation schemes for parabolic partial differential ...
AbstractAn algorithm for the solution of nonlinear systems of parabolic partial differential equatio...
summary:The paper aims at a further development of the finite element method, when applied to mixed ...
This dissertation presents a redefined operator splitting method used in solving semilinear paraboli...
Many computational fluids problems are described by nonlinear parabolic partial differential equatio...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/16...
The first half of the paper provides an overview of a new engineering software tool that is designed...
AbstractThe FORTRAN program RKC is intended for the time integration of parabolic partial differenti...
AbstractNew types of split linear multistep methods (SLMMs) are applied to the numerical solution of...
In this paper we introduce a new, simple and efficient numerical scheme for the implementation of th...
AbstractThis paper is concerned with the numerical solution of parabolic equations coupled with grad...
and their applications. SMC is sponsored by the Netherlands Organization for Scientific Research (NW...
In the current paper a numerical approach is presented for solving a system of coupled gradient-diff...
AbstractA numerical comparison is made between three integration methods for semi-discrete parabolic...
summary:We develop gradient schemes for the approximation of the Perona-Malik equations and nonlinea...
Splitting methods are widely used temporal approximation schemes for parabolic partial differential ...
AbstractAn algorithm for the solution of nonlinear systems of parabolic partial differential equatio...
summary:The paper aims at a further development of the finite element method, when applied to mixed ...
This dissertation presents a redefined operator splitting method used in solving semilinear paraboli...
Many computational fluids problems are described by nonlinear parabolic partial differential equatio...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/16...
The first half of the paper provides an overview of a new engineering software tool that is designed...
AbstractThe FORTRAN program RKC is intended for the time integration of parabolic partial differenti...
AbstractNew types of split linear multistep methods (SLMMs) are applied to the numerical solution of...
In this paper we introduce a new, simple and efficient numerical scheme for the implementation of th...