New spectral element basis functions are constructed for problems possessing an axis of symmetry. In problems defined in domains with an axis of symmetry there is a potential problem of degeneracy of the system of discrete equations corresponding to nodes located on the axis of symmetry. The standard spectral element basis functions are modified so that the axial conditions are satisfied identically. The modified basis is employed only in spectral elements that are adjacent to the axis of symmetry. This modification of the spectral element method ensures that the nodes are the same in each element, which is not the case in other methods that have been proposed to tackle the problem along the axis of symmetry, and that there are no nodes alo...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
New spectral element basis functions are constructed for problems possessing an axis of symmetry. In...
AbstractNew spectral element basis functions are constructed for problems possessing an axis of symm...
We present an application of the spectral-element method to model axisymmetric flows in rapidly rota...
Abstract: The Stokes problem in a tridimensional axisymmetric domain results into a countable family...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
This work presents application of spectral element method (SEM) for solving partial differential equ...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
Spectral methods, particularly in their multidomain version, have become firmly established as a mai...
International audienceWe present a review in the construction of accurate and efficient multivariate...
In this article, we implement the mortar spectral element method for the Stokes problem on a domain...
In the spectral solution of 3-D Poisson equations in cylindrical and spherical coordinates including...
Abstract. We analyze a new formulation of the Stokes equations in three-dimensional axisymmetric geo...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
New spectral element basis functions are constructed for problems possessing an axis of symmetry. In...
AbstractNew spectral element basis functions are constructed for problems possessing an axis of symm...
We present an application of the spectral-element method to model axisymmetric flows in rapidly rota...
Abstract: The Stokes problem in a tridimensional axisymmetric domain results into a countable family...
The spectral/hp element method combines the geometric flexibility of the classical h-type finite ele...
This work presents application of spectral element method (SEM) for solving partial differential equ...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
Spectral methods, particularly in their multidomain version, have become firmly established as a mai...
International audienceWe present a review in the construction of accurate and efficient multivariate...
In this article, we implement the mortar spectral element method for the Stokes problem on a domain...
In the spectral solution of 3-D Poisson equations in cylindrical and spherical coordinates including...
Abstract. We analyze a new formulation of the Stokes equations in three-dimensional axisymmetric geo...
It is well known that the fast and accurate solution of the partial differential equations (PDEs) go...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...