AbstractIn this work we propose an iterative penalty method for addressing the Stokes equations. We can use a “not very small” penalty parameter to avoid the unstable computation by iteration. The Numerical experiments show that the algorithm is very effective
In the last 10 years many 3D numerical schemes have been developed for the study the flow of a mixtu...
Consider the Cauchy problem for the non-degenerate Kirchhoff type dissipative wave equations with th...
International audienceWe consider Chorin-Temam scheme (the simplest pressure-correction projection m...
Inspired by the novel ensemble method for the Navier-Stokes equations (NSE) in 2014 \cite{Nan-Layton...
The paper presents an algorithm of adaptation by successive mesh regeneration and its application to...
AbstractMixed and hybrid finite element methods for the resolution of a wide range of linear and non...
An optimal error estimate of the numerical velocity, pressure and angular velocity, is proved for th...
AbstractA fully discrete penalty finite element method is presented for the two-dimensional time-dep...
We present a reduced basis Smagorinsky model. This model includes a non-linear eddy diffusion term t...
We present error estimates of a linear fully discrete scheme for a threedimensional mass diffusion ...
AbstractWe study a model linear convection–diffusion–reaction problem where both the diffusion term ...
We consider the numerical solution of a fourth‐order total variation flow problem representing surfa...
AbstractWe study convergence properties of a first-order upwind difference scheme applied to a weakl...
Solving problems regarding the optimal control of partial differential equations (PDEs) – also known...
We construct a consistent multiplier free method for the finite element solution of the obstacle pro...
In the last 10 years many 3D numerical schemes have been developed for the study the flow of a mixtu...
Consider the Cauchy problem for the non-degenerate Kirchhoff type dissipative wave equations with th...
International audienceWe consider Chorin-Temam scheme (the simplest pressure-correction projection m...
Inspired by the novel ensemble method for the Navier-Stokes equations (NSE) in 2014 \cite{Nan-Layton...
The paper presents an algorithm of adaptation by successive mesh regeneration and its application to...
AbstractMixed and hybrid finite element methods for the resolution of a wide range of linear and non...
An optimal error estimate of the numerical velocity, pressure and angular velocity, is proved for th...
AbstractA fully discrete penalty finite element method is presented for the two-dimensional time-dep...
We present a reduced basis Smagorinsky model. This model includes a non-linear eddy diffusion term t...
We present error estimates of a linear fully discrete scheme for a threedimensional mass diffusion ...
AbstractWe study a model linear convection–diffusion–reaction problem where both the diffusion term ...
We consider the numerical solution of a fourth‐order total variation flow problem representing surfa...
AbstractWe study convergence properties of a first-order upwind difference scheme applied to a weakl...
Solving problems regarding the optimal control of partial differential equations (PDEs) – also known...
We construct a consistent multiplier free method for the finite element solution of the obstacle pro...
In the last 10 years many 3D numerical schemes have been developed for the study the flow of a mixtu...
Consider the Cauchy problem for the non-degenerate Kirchhoff type dissipative wave equations with th...
International audienceWe consider Chorin-Temam scheme (the simplest pressure-correction projection m...
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