An optimal error estimate of the numerical velocity, pressure and angular velocity, is proved for the fully discrete penalty finite element method of the micropolar equations, when the parameters ², ∆t and h are sufficiently small. In order to obtain above we present the time discretization of the penalty micropolar equation which is based on the backward Euler scheme; the spatial discretization of the time discretized penalty Micropolar equation is based on a finite elements space pair (Hh, Lh) which satisfies some approximate assumption
AbstractIn this paper, we consider second order elliptic problems with rapidly oscillating coefficie...
The aim of the paper is to present a nontrivial and natural extension of the comparison result and ...
A novel first-principles self-consistent model that couples plasma and neutral atom physics suitable...
AbstractThis paper deals with the approximation problem on anisotropic Besov classes SpθrB(Rd),p=(p1...
AbstractWe are interested in approximating the solution of a first-order quasi-linear equation assoc...
We present error estimates of a linear fully discrete scheme for a threedimensional mass diffusion ...
AbstractIn this work we obtain results on the estimates of low Sobolev norms for solutions of some n...
We study continuous dependence estimates for viscous Hamilton–Jacobi equations defined on a network ...
The article discusses the problem of approximating solutions of differential equations describing th...
In this paper we consider nonstationary 1D-flow of a micropolar viscous compressible fluid, which is...
AbstractIn this paper, we discuss an elliptic variational inequality with double obstacles in a fini...
AbstractIn this paper we give new estimates for the solution to the Schrödinger equation with quadra...
International audienceA family of fourth order locally implicit schemes is presented as a special ca...
A class of non linear fractional partial differential equations with initial and Dirichlet boundary ...
AbstractThe Cauchy problem of the Landau equation with potential forces on torus is investigated. Th...
AbstractIn this paper, we consider second order elliptic problems with rapidly oscillating coefficie...
The aim of the paper is to present a nontrivial and natural extension of the comparison result and ...
A novel first-principles self-consistent model that couples plasma and neutral atom physics suitable...
AbstractThis paper deals with the approximation problem on anisotropic Besov classes SpθrB(Rd),p=(p1...
AbstractWe are interested in approximating the solution of a first-order quasi-linear equation assoc...
We present error estimates of a linear fully discrete scheme for a threedimensional mass diffusion ...
AbstractIn this work we obtain results on the estimates of low Sobolev norms for solutions of some n...
We study continuous dependence estimates for viscous Hamilton–Jacobi equations defined on a network ...
The article discusses the problem of approximating solutions of differential equations describing th...
In this paper we consider nonstationary 1D-flow of a micropolar viscous compressible fluid, which is...
AbstractIn this paper, we discuss an elliptic variational inequality with double obstacles in a fini...
AbstractIn this paper we give new estimates for the solution to the Schrödinger equation with quadra...
International audienceA family of fourth order locally implicit schemes is presented as a special ca...
A class of non linear fractional partial differential equations with initial and Dirichlet boundary ...
AbstractThe Cauchy problem of the Landau equation with potential forces on torus is investigated. Th...
AbstractIn this paper, we consider second order elliptic problems with rapidly oscillating coefficie...
The aim of the paper is to present a nontrivial and natural extension of the comparison result and ...
A novel first-principles self-consistent model that couples plasma and neutral atom physics suitable...