Add to ORKGSpectral element methods (SEM) exhibit exponential convergence only when the solution of the problem is sufficiently regular. However, the solution develops a singularity when the boundary of the domain is non-smooth. The accuracy of the SEM is then deteriorated and they offer no advantage over low order methods. Such problems frequently occur in many important physical applications, for example in structural mechanics. A new h-p spectral element method is presented which resolves this form of singularity and gives asymptotically faster results than conventional methods, while retaining the same order of convergence. Moreover, the computational algorithm is devised to harness the potential of widely available parallel computers
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
AbstractA spectral element method is described which enables Poisson problems defined in irregular i...
In this thesis we applied a spectral element approximation to some elliptic partial differential eq...
For smooth problems spectral element methods (SEM) exhibit exponential convergence and have been ver...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
Abstract. In this paper we show that we can use a modified version of the h-p spectral element metho...
In a series of papers of which this is the first we study how to solve elliptic problems on polygona...
In this paper we show that the h-p spectral element method developed in 3,8,9 applies to elliptic pr...
We present a fully unstructured, parallel spectral element method based on domain decomposition. The...
In a polygonal domain, the solution of a linear elliptic problem is written as a sum of a regular p...
AbstractA spectral element method for solving parabolic initial boundary value problems on smooth do...
A parallel and scalable domain decomposition method for unstructured and hybrid spectral element dis...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
We provide an overview of the state of the art of adaptive strategies for high-order hp discretizati...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
AbstractA spectral element method is described which enables Poisson problems defined in irregular i...
In this thesis we applied a spectral element approximation to some elliptic partial differential eq...
For smooth problems spectral element methods (SEM) exhibit exponential convergence and have been ver...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
Abstract. In this paper we show that we can use a modified version of the h-p spectral element metho...
In a series of papers of which this is the first we study how to solve elliptic problems on polygona...
In this paper we show that the h-p spectral element method developed in 3,8,9 applies to elliptic pr...
We present a fully unstructured, parallel spectral element method based on domain decomposition. The...
In a polygonal domain, the solution of a linear elliptic problem is written as a sum of a regular p...
AbstractA spectral element method for solving parabolic initial boundary value problems on smooth do...
A parallel and scalable domain decomposition method for unstructured and hybrid spectral element dis...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
We provide an overview of the state of the art of adaptive strategies for high-order hp discretizati...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
AbstractA spectral element method is described which enables Poisson problems defined in irregular i...
In this thesis we applied a spectral element approximation to some elliptic partial differential eq...