AbstractStability of the pseudospectral Chebychev collocation solution of the two-dimensional acoustic wave problem with absorbing boundary conditions is investigated. The continuous one-dimensional problem with one absorbing boundary and one Dirichlet boundary has previously been shown to be far from normal. Consequently, the spectrum of that problem says little about the stability behavior of the solution. Our analysis proves that the discrete formulation with Dirichlet boundaries at all boundaries is near normal and hence the formulation with absorbing boundaries at all boundaries, either for one-dimensional or two-dimensional wave propagation, is not far from normal. The near-normality follows from the near-normality of the second-order...
In this thesis, I develop accurate and efficient pseudospectral methods to solve Fisher's, the Fitzh...
Abstract. We consider operators − ∆ + X, where X is a constant vector field, in a bounded domain and...
A method for “strongly ” implementing homogeneous Dirichlet boundary conditions for one-dimensional ...
AbstractStability of the pseudospectral Chebychev collocation solution of the two-dimensional acoust...
In this paper we develop a method for the simulation of wave propagation on artificially bounded dom...
For systems which can be described by u(sub t) = Au with a highly non-normal matrix or operator A, t...
The accuracy of the multi-domain Chebyshev pseudospectral method is investigated for wave propagatio...
Many practical problems involve wave propagation through atmosphere, oceans, or terrestrial crust. M...
AbstractFor systems which can be described by ut = Au, with a highly nonnormal matrix or operator A,...
We study wave transmission through infinite media. From the computational point of view, an infinite...
International audienceThe calculation of wave radiation in exterior domains by finite element method...
A new method to impose boundary conditions for pseudospectral approximations to hyperbolic equations...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
Chebychev semi-discretizations for both ordinary and partial differential equations are explored. Th...
During my PhD, I have worked on the construction of absorbing boundary conditions (ABCs) designed fo...
In this thesis, I develop accurate and efficient pseudospectral methods to solve Fisher's, the Fitzh...
Abstract. We consider operators − ∆ + X, where X is a constant vector field, in a bounded domain and...
A method for “strongly ” implementing homogeneous Dirichlet boundary conditions for one-dimensional ...
AbstractStability of the pseudospectral Chebychev collocation solution of the two-dimensional acoust...
In this paper we develop a method for the simulation of wave propagation on artificially bounded dom...
For systems which can be described by u(sub t) = Au with a highly non-normal matrix or operator A, t...
The accuracy of the multi-domain Chebyshev pseudospectral method is investigated for wave propagatio...
Many practical problems involve wave propagation through atmosphere, oceans, or terrestrial crust. M...
AbstractFor systems which can be described by ut = Au, with a highly nonnormal matrix or operator A,...
We study wave transmission through infinite media. From the computational point of view, an infinite...
International audienceThe calculation of wave radiation in exterior domains by finite element method...
A new method to impose boundary conditions for pseudospectral approximations to hyperbolic equations...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
Chebychev semi-discretizations for both ordinary and partial differential equations are explored. Th...
During my PhD, I have worked on the construction of absorbing boundary conditions (ABCs) designed fo...
In this thesis, I develop accurate and efficient pseudospectral methods to solve Fisher's, the Fitzh...
Abstract. We consider operators − ∆ + X, where X is a constant vector field, in a bounded domain and...
A method for “strongly ” implementing homogeneous Dirichlet boundary conditions for one-dimensional ...