International audienceIn this paper we study the conforming Galerkin approximation of the problem: find u ∈ U such that a(u, v) = L(v) for all v ∈ V, where U and V are Hilbert or Banach spaces, a is a continuous bilinear or sesquilinear form and L ∈ V' a given data. The approximate solution is sought in a finite dimensional subspace of U, and test functions are taken in a finite dimensional subspace of V. We provide a necessary and sufficient condition on the form a for convergence of the Galerkin approximation, which is also equivalent to convergence of the Galerkin approximation for the adjoint problem. We also characterize the fact that U has a finite dimensional Schauder decomposition in terms of properties related to the Galerkin appro...
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractWe study approximation of linear functionals on separable Banach spaces equipped with a Gaus...
Complementary problems play a central role in equilibrium finding, physical simulation, and optimiza...
In this paper we study the conforming Galerkin approximation of the problem: find u ∈ U such that a(...
AbstractThis paper presents a modified version of the Galerkin method in which the original bilinear...
For any continuous bilinear form defined on a pair of Hilbert spaces satisfying the compatibility La...
Let X be a separable Banach space over the reals and let X· be its dual. If x ϵ X and u ϵ X* we wil...
In 1972, Babuska and Aziz introduced a Galerkin approximation theory for saddle point formulations o...
AbstractFor any continuous bilinear form defined on a pair of Hilbert spaces satisfying the compatib...
International audienceNonlinear optimal control problems in Hilbert spaces are considered for which ...
Following work by Atteia, Laurent, Bezhaev and Vasilenko, we formulate the problems of constrained s...
Abstract. Given a Banach space X and a subspace Y, the pair (X,Y) is said to have the approximation ...
AbstractIn this paper we prove that a Hilbert structure is necessary as well as sufficient for linea...
AbstractWe study the worst case setting for approximation of d variate functions from a general repr...
We design an abstract setting for the approximation in Banach spaces of operators acting in duality....
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractWe study approximation of linear functionals on separable Banach spaces equipped with a Gaus...
Complementary problems play a central role in equilibrium finding, physical simulation, and optimiza...
In this paper we study the conforming Galerkin approximation of the problem: find u ∈ U such that a(...
AbstractThis paper presents a modified version of the Galerkin method in which the original bilinear...
For any continuous bilinear form defined on a pair of Hilbert spaces satisfying the compatibility La...
Let X be a separable Banach space over the reals and let X· be its dual. If x ϵ X and u ϵ X* we wil...
In 1972, Babuska and Aziz introduced a Galerkin approximation theory for saddle point formulations o...
AbstractFor any continuous bilinear form defined on a pair of Hilbert spaces satisfying the compatib...
International audienceNonlinear optimal control problems in Hilbert spaces are considered for which ...
Following work by Atteia, Laurent, Bezhaev and Vasilenko, we formulate the problems of constrained s...
Abstract. Given a Banach space X and a subspace Y, the pair (X,Y) is said to have the approximation ...
AbstractIn this paper we prove that a Hilbert structure is necessary as well as sufficient for linea...
AbstractWe study the worst case setting for approximation of d variate functions from a general repr...
We design an abstract setting for the approximation in Banach spaces of operators acting in duality....
AbstractIn this note it is indicated that the problem of best approximation with respect to the supr...
AbstractWe study approximation of linear functionals on separable Banach spaces equipped with a Gaus...
Complementary problems play a central role in equilibrium finding, physical simulation, and optimiza...