Abstract: For Laplace's equation, we state a control volume, which guarantees a positive finite volume scheme with linear reconstruction of the solution on any unstructured grid. The control volume is defined by a property of the analytical solution to the equation and does not depend on grid geometry. For those problems where the choice of the control volume is prescribed a priori, we discuss how to improve positivity of the finite volume scheme with the linear reconstruction by using corrected reconstruction stencils. Numerical examples illustrated the developed approach to the stencil correction are consideredNote: Research direction:Mathematical problems and theory of numerical method
The finite volume method is a popular method for the solution of systems of partial differential equ...
An improved high resolution finite volume method based on linear and quadratic variable reconstructi...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...
Abstract. For Laplace’s equation, we discuss whether it is possible to construct a linear positive f...
Abstract: Finite volume approximation to Laplace equation on unstructured grids with gener...
This thesis concerns the numerical approximation of the solutions to hyperbolic conservation laws. I...
Linear reconstruction based on local cell-averaged values is the most commonly adopted technique to ...
International audienceThe purpose of this work is to build a general framework to reconstruct the un...
We consider the Finite Volume method for conservation laws with high order polynomial reconstruction...
International audienceWe review sharpening methods for finite volume schemes, with an emphasis on th...
International audienceWe present a simple algorithm to refine a finite volume bidimensional mesh adm...
In the present paper, a multi-step reconstruction procedure is proposed for high order finite volume...
High-resolution finite volume schemes based on a novel reconstruction technique, SDWLS (solution-dep...
The purpose of this work is to build a general framework to reconstruct the underlying fields within...
International audienceWhen adopting high-order finite-volume schemes based on MUSCL reconstruction t...
The finite volume method is a popular method for the solution of systems of partial differential equ...
An improved high resolution finite volume method based on linear and quadratic variable reconstructi...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...
Abstract. For Laplace’s equation, we discuss whether it is possible to construct a linear positive f...
Abstract: Finite volume approximation to Laplace equation on unstructured grids with gener...
This thesis concerns the numerical approximation of the solutions to hyperbolic conservation laws. I...
Linear reconstruction based on local cell-averaged values is the most commonly adopted technique to ...
International audienceThe purpose of this work is to build a general framework to reconstruct the un...
We consider the Finite Volume method for conservation laws with high order polynomial reconstruction...
International audienceWe review sharpening methods for finite volume schemes, with an emphasis on th...
International audienceWe present a simple algorithm to refine a finite volume bidimensional mesh adm...
In the present paper, a multi-step reconstruction procedure is proposed for high order finite volume...
High-resolution finite volume schemes based on a novel reconstruction technique, SDWLS (solution-dep...
The purpose of this work is to build a general framework to reconstruct the underlying fields within...
International audienceWhen adopting high-order finite-volume schemes based on MUSCL reconstruction t...
The finite volume method is a popular method for the solution of systems of partial differential equ...
An improved high resolution finite volume method based on linear and quadratic variable reconstructi...
In this work we briefly describe a technique to define second order finite volume schemes on non uni...