Add to ORKGThis paper is concerned with the numerical treatment of quasilinear elliptic partial differential equations. In order to solve the given equation we propose to use a Galerkin approach, but, in contrast to conventional finite element discretizations, we work with trial spaces that, not only exhibit the usual approximation and good localization properties, but, in addition, lead to expansions of any element in the underlying Hilbert spaces in terms in multiscale or wavelet bases with certain stability properties. Specifically, we select as trial spaces a nested sequence of spaces from an appropriate biorthogonal multiscale analysis. This gives rise to a nonlinear discretized system. To overcome the problems of nonlinearity, we make use of the...
International audienceThe discrete orthogonal wavelet-Galerkin method is illustrated as an effective...
Most of the physical problems including sound waves in a viscous medium, waves in fluid filled visco...
We have designed a cubic spline wavelet decomposition for the Sobolev space H(sup 2)(sub 0)(I) where...
This paper is concerned with the numerical treatment of quasilinear elliptic partial differential eq...
The purpose of this paper is to present a wavelet–Galerkin scheme for solving nonlinear elliptic pa...
The purpose of this paper is to present a wavelet{Galerkin scheme for solving nonlinear elliptic par...
AbstractThis paper is concerned with recent developments of wavelet schemes for the numerical treatm...
International audienceIn this paper we review the application of wavelets to the solution of partial...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
The use of multiresolution techniques and wavelets has become increa-singly popular in the developme...
this paper we consider the application of powerful methods of wavelet analysis to polynomial approxi...
AbstractWe describe a wavelet collocation method for the numerical solution of partial differential ...
We present ideas on how to use wavelets in the solution of boundary value ordinary differential equa...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
Wavelet bases are used to generate spaces of approximation for the resolution of bidimensional ellip...
International audienceThe discrete orthogonal wavelet-Galerkin method is illustrated as an effective...
Most of the physical problems including sound waves in a viscous medium, waves in fluid filled visco...
We have designed a cubic spline wavelet decomposition for the Sobolev space H(sup 2)(sub 0)(I) where...
This paper is concerned with the numerical treatment of quasilinear elliptic partial differential eq...
The purpose of this paper is to present a wavelet–Galerkin scheme for solving nonlinear elliptic pa...
The purpose of this paper is to present a wavelet{Galerkin scheme for solving nonlinear elliptic par...
AbstractThis paper is concerned with recent developments of wavelet schemes for the numerical treatm...
International audienceIn this paper we review the application of wavelets to the solution of partial...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
The use of multiresolution techniques and wavelets has become increa-singly popular in the developme...
this paper we consider the application of powerful methods of wavelet analysis to polynomial approxi...
AbstractWe describe a wavelet collocation method for the numerical solution of partial differential ...
We present ideas on how to use wavelets in the solution of boundary value ordinary differential equa...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
Wavelet bases are used to generate spaces of approximation for the resolution of bidimensional ellip...
International audienceThe discrete orthogonal wavelet-Galerkin method is illustrated as an effective...
Most of the physical problems including sound waves in a viscous medium, waves in fluid filled visco...
We have designed a cubic spline wavelet decomposition for the Sobolev space H(sup 2)(sub 0)(I) where...