Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by KIYOSHI MIZOHATA. The Symposium on Applied Mathematics. 18-20 September 1997. The Conference Hall of MIZUTA Memorial Library Josai University
We report on a successful implementation of a wavelet based Poisson solver for use in 3D particle-i...
This chapter highlights recent developments concerning adaptive wavelet methods for time dependent a...
International audienceIn this paper we review the application of wavelets to the solution of partial...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
International audienceIt is shown how various ideas that are well established for the solution of Po...
The computation of physical properties in a digital materials labora- tory requires significant comp...
We report on a successful implementation of a three-dimensional wavelet-based solver for the Poisson...
The use of multiresolution techniques and wavelets has become increasingly popular in the developmen...
AbstractWe describe a wavelet collocation method for the numerical solution of partial differential ...
Preconditioning for the Pressure Poisson Equation, used with the fractional step Navier--Stokes solv...
We present a wavelet multigrid preconditioner for the conjugate gradient method which gives an effic...
Abstract. Various scientific models demand finer and finer resolutions of relevant features. Paradox...
China and India Award of Royal Academy of Engineering, UK to Drs Eldad Avital and Krishna M. Singh. ...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
We report on a successful implementation of a wavelet based Poisson solver for use in 3D particle-i...
This chapter highlights recent developments concerning adaptive wavelet methods for time dependent a...
International audienceIn this paper we review the application of wavelets to the solution of partial...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
International audienceIt is shown how various ideas that are well established for the solution of Po...
The computation of physical properties in a digital materials labora- tory requires significant comp...
We report on a successful implementation of a three-dimensional wavelet-based solver for the Poisson...
The use of multiresolution techniques and wavelets has become increasingly popular in the developmen...
AbstractWe describe a wavelet collocation method for the numerical solution of partial differential ...
Preconditioning for the Pressure Poisson Equation, used with the fractional step Navier--Stokes solv...
We present a wavelet multigrid preconditioner for the conjugate gradient method which gives an effic...
Abstract. Various scientific models demand finer and finer resolutions of relevant features. Paradox...
China and India Award of Royal Academy of Engineering, UK to Drs Eldad Avital and Krishna M. Singh. ...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
We report on a successful implementation of a wavelet based Poisson solver for use in 3D particle-i...
This chapter highlights recent developments concerning adaptive wavelet methods for time dependent a...
International audienceIn this paper we review the application of wavelets to the solution of partial...