26 pagesInternational audienceWe address in this paper a fractional-step scheme for the simulation of incompressible flows falling in the class of penalty-projection methods. The velocity prediction is similar to a penalty method prediction step, or, equivalently, differs from the incremental projection method one by the introduction of a penalty term built to enforce the divergence-free constraint. Then, a projection step based on a pressure Poisson equation is performed, to update the pressure and obtain an (approximately) divergence-free end-of-step velocity. An analysis in the energy norms for the model unsteady Stokes problem shows that this scheme enjoys the time convergence properties of both underlying methods: for low value of the ...
We revisit fractional step projection methods for solving the Navier-Stokes equations. We study a va...
In this thesis, we describe a globally second-order accurate sharp immersed boundary projection meth...
We present some improvements on the error estimates obtained by J.Blasco and R.Codina for a viscosit...
We address in this paper a fractional-step scheme for the simulation of incompressible flows falling...
26 pagesInternational audienceWe address in this paper a fractional-step scheme for the simulation o...
AbstractThe classical projection method and its variants have been widely used in practice because o...
8 pagesInternational audienceA new family of methods, the so-called two-parameter {\em vector penalt...
The penalty-projection method for the solution of Navier-Stokes equations may be viewed as a project...
AbstractWe deal with the time-dependent Navier–Stokes equations (NSE) with Dirichlet boundary condit...
International audienceA new family of methods, the so-called vector penalty-projection methods (VPP$...
In this paper we provide an error analysis of a fractional-step method for the numerical solution of...
L'objectif de cette thèse consiste à étudier la méthode de pénalité-projection vectorielle notée VPP...
International audienceWe present a study of the incremental projection method to solve incompressibl...
This note presents a new method of direct forcing to deal with obstacles in incompressible flows. It...
summary:We consider the finite element method for the time-dependent Stokes problem with the slip bo...
We revisit fractional step projection methods for solving the Navier-Stokes equations. We study a va...
In this thesis, we describe a globally second-order accurate sharp immersed boundary projection meth...
We present some improvements on the error estimates obtained by J.Blasco and R.Codina for a viscosit...
We address in this paper a fractional-step scheme for the simulation of incompressible flows falling...
26 pagesInternational audienceWe address in this paper a fractional-step scheme for the simulation o...
AbstractThe classical projection method and its variants have been widely used in practice because o...
8 pagesInternational audienceA new family of methods, the so-called two-parameter {\em vector penalt...
The penalty-projection method for the solution of Navier-Stokes equations may be viewed as a project...
AbstractWe deal with the time-dependent Navier–Stokes equations (NSE) with Dirichlet boundary condit...
International audienceA new family of methods, the so-called vector penalty-projection methods (VPP$...
In this paper we provide an error analysis of a fractional-step method for the numerical solution of...
L'objectif de cette thèse consiste à étudier la méthode de pénalité-projection vectorielle notée VPP...
International audienceWe present a study of the incremental projection method to solve incompressibl...
This note presents a new method of direct forcing to deal with obstacles in incompressible flows. It...
summary:We consider the finite element method for the time-dependent Stokes problem with the slip bo...
We revisit fractional step projection methods for solving the Navier-Stokes equations. We study a va...
In this thesis, we describe a globally second-order accurate sharp immersed boundary projection meth...
We present some improvements on the error estimates obtained by J.Blasco and R.Codina for a viscosit...