International audienceAnisotropic adaptive methods based on a metric related to the Hessian of the solution are considered. We propose a metric targeted to the minimization of interpolation error gradient for a nonconforming linear finite element approximation of a given piecewise regular function on a polyhedral domain Omega of IRd, d >= 2. We also present an algorithm generating a sequence of asymptotically quasi-optimal meshes relative to such a nonconforming discretization and give numerical asymptotic behavior of the error reduction produced by the generated mesh
AbstractThe question of adaptive mesh generation for approximation by splines has been studied for a...
Applications of mesh adaption techniques could be found in the numerical solution of PDE’s or in the...
In this work, new interpolation error estimates have been derived for some well-known interpolators ...
International audienceAnisotropic adaptive methods based on a metric related to the Hessian of the s...
Anisotropic adaptive methods based on a metric related to the Hessian of the solution are ...
Given a function f defined on a bounded domain Ω IR2 and a number N> 0, we study the properties ...
Given a function f defined on a bounded polygonal domain Ω ⊂ IR2 and a number N> 0, we study the ...
International audienceIn this paper we derive a multi-dimensional mesh adaptation method which produ...
In this paper, we present a new optimal interpolation error estimate in L-p norm ( 1 <= p <= i...
International audienceGiven a function ƒ defined on a bounded bidimensional domain and a number N > ...
We present a new method for generating a d-dimensional simplicial mesh that minimizes the ...
For any triangulation of a given polygonal region, consider the piecewise linear least squares appro...
We study the properties of a simple greedy algorithm introduced in [8] for the generation of data-ad...
summary:We propose and examine a simple averaging formula for the gradient of linear finite elements...
International audienceFor any positive integer k, the (k+1)st-order tensor for the partial derivativ...
AbstractThe question of adaptive mesh generation for approximation by splines has been studied for a...
Applications of mesh adaption techniques could be found in the numerical solution of PDE’s or in the...
In this work, new interpolation error estimates have been derived for some well-known interpolators ...
International audienceAnisotropic adaptive methods based on a metric related to the Hessian of the s...
Anisotropic adaptive methods based on a metric related to the Hessian of the solution are ...
Given a function f defined on a bounded domain Ω IR2 and a number N> 0, we study the properties ...
Given a function f defined on a bounded polygonal domain Ω ⊂ IR2 and a number N> 0, we study the ...
International audienceIn this paper we derive a multi-dimensional mesh adaptation method which produ...
In this paper, we present a new optimal interpolation error estimate in L-p norm ( 1 <= p <= i...
International audienceGiven a function ƒ defined on a bounded bidimensional domain and a number N > ...
We present a new method for generating a d-dimensional simplicial mesh that minimizes the ...
For any triangulation of a given polygonal region, consider the piecewise linear least squares appro...
We study the properties of a simple greedy algorithm introduced in [8] for the generation of data-ad...
summary:We propose and examine a simple averaging formula for the gradient of linear finite elements...
International audienceFor any positive integer k, the (k+1)st-order tensor for the partial derivativ...
AbstractThe question of adaptive mesh generation for approximation by splines has been studied for a...
Applications of mesh adaption techniques could be found in the numerical solution of PDE’s or in the...
In this work, new interpolation error estimates have been derived for some well-known interpolators ...