Add to ORKGSpectral element methods are high-order weighted residual techniques for partial differential equations that combine the geometric flexibility of finite element methods with the rapid convergence of spectral techniques. Spectral element methods are described for the simulation of incompressible fluid flows, with special emphasis on implementation of spectral element techniques on medium-grained parallel processors. Two parallel architectures are considered: the first, a commercially available message-passing hypercube system; the second, a developmental reconfigurable architecture based on Geometry-Defining Processors. High parallel efficiency is obtained in hypercube spectral element computations, indicating that load balancing and communi...
Two decades ago spectral element methods were developed in order to unite the the geometrical flexib...
International audienceFinite element methods are one of the most prominent discretisation techniques...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
We present a fully unstructured, parallel spectral element method based on domain decomposition. The...
We describe the development and implementation of a spectral element code for multimillion gridpoint...
As computer hardware has evolved, the time required to perform numerical simulations has reduced, al...
We present a parallel implementation of a fully unstructured spectral element method for elastic wav...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
An adaptive spectral method was developed for the efficient solution of time dependent partial diffe...
Le sujet de cette thèse consiste à étudier diverses pistes pour optimiser le temps de calcul de la m...
We describe the development and implementation of an efficient spectral element code for multimillio...
© 2017, Springer International Publishing AG. There is an increasing requirement from both academia ...
The parallelization of the least-squares spectral element formulation of the Stokes problem has rece...
The need to reduce both the time and cost of product design has allowed numerical analysis to play a...
International audienceFinite element methods are one of the most prominent discretisation techniques...
Two decades ago spectral element methods were developed in order to unite the the geometrical flexib...
International audienceFinite element methods are one of the most prominent discretisation techniques...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
We present a fully unstructured, parallel spectral element method based on domain decomposition. The...
We describe the development and implementation of a spectral element code for multimillion gridpoint...
As computer hardware has evolved, the time required to perform numerical simulations has reduced, al...
We present a parallel implementation of a fully unstructured spectral element method for elastic wav...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
An adaptive spectral method was developed for the efficient solution of time dependent partial diffe...
Le sujet de cette thèse consiste à étudier diverses pistes pour optimiser le temps de calcul de la m...
We describe the development and implementation of an efficient spectral element code for multimillio...
© 2017, Springer International Publishing AG. There is an increasing requirement from both academia ...
The parallelization of the least-squares spectral element formulation of the Stokes problem has rece...
The need to reduce both the time and cost of product design has allowed numerical analysis to play a...
International audienceFinite element methods are one of the most prominent discretisation techniques...
Two decades ago spectral element methods were developed in order to unite the the geometrical flexib...
International audienceFinite element methods are one of the most prominent discretisation techniques...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...