This paper describes the application of the least-squares spectral element method to compressible flow problems. Special attention is paid to the imposition of the weak boundary conditions along curved walls and the influence of the time step on the position and resolution of shocks. The method is described and results are presented for a supersonic flow over a wedge and subsonic, transonic and supersonic flow problems over a bump
Least-squares spectral element solution of steady, two-dimensional, incompressible flows are obtaine...
In this work a new approach to time dependent problems in combination with the Least-Squares Spectra...
The aim of this article is to present and analyze first-order system least-squares spectral method f...
This paper describes the application of the least-squares spectral element method to compressible fl...
This paper describes the application of the least-squares spectral element method to compressible fl...
Least-squares spectral element methods are based on two important and successful numerical methods: ...
The least-squares spectral element method (LSSEM) is a relatively new state of the art numerical met...
Spectral methods for compressible flows are introduced in relation to finite difference and finite e...
Least-squares finite element method (LSFEM) is employed to simulate 2-D and axisymmetric flows gover...
The least-squares spectral element method (LSQSEM) combines the flexibility of the finite element me...
summary:A method to approximate the Euler equations is presented. The method is a multi-domain appro...
AbstractA numerical spectral element method for the computation of fluid flows governed by the incom...
This article studies a least-squares finite element method for the numerical approximation of compre...
This papers describes the use of the Least-Squares Spectral Element Method to polynomial Chaos to so...
Many problems involving fluid flow can now be simulated numerically, providing a useful predictive t...
Least-squares spectral element solution of steady, two-dimensional, incompressible flows are obtaine...
In this work a new approach to time dependent problems in combination with the Least-Squares Spectra...
The aim of this article is to present and analyze first-order system least-squares spectral method f...
This paper describes the application of the least-squares spectral element method to compressible fl...
This paper describes the application of the least-squares spectral element method to compressible fl...
Least-squares spectral element methods are based on two important and successful numerical methods: ...
The least-squares spectral element method (LSSEM) is a relatively new state of the art numerical met...
Spectral methods for compressible flows are introduced in relation to finite difference and finite e...
Least-squares finite element method (LSFEM) is employed to simulate 2-D and axisymmetric flows gover...
The least-squares spectral element method (LSQSEM) combines the flexibility of the finite element me...
summary:A method to approximate the Euler equations is presented. The method is a multi-domain appro...
AbstractA numerical spectral element method for the computation of fluid flows governed by the incom...
This article studies a least-squares finite element method for the numerical approximation of compre...
This papers describes the use of the Least-Squares Spectral Element Method to polynomial Chaos to so...
Many problems involving fluid flow can now be simulated numerically, providing a useful predictive t...
Least-squares spectral element solution of steady, two-dimensional, incompressible flows are obtaine...
In this work a new approach to time dependent problems in combination with the Least-Squares Spectra...
The aim of this article is to present and analyze first-order system least-squares spectral method f...