ABSTRACTWhen modeling wave propagation, truncation of the computational domain to a manageable size requires nonreflecting boundaries. To construct such a boundary condition on one side of a rectangular domain for a finite-difference discretization of the acoustic wave equation in the frequency domain, the domain is extended on that one side to infinity. Constant extrapolation in the direction perpendicular to the boundary provides the material properties in the exterior. Domain decomposition can split the enlarged domain into the original one and its exterior. Because the boundary-value problem for the latter is translation-invariant, the boundary Green functions obey a quadratic matrix equation. Selection of the solvent that corresponds t...
Abstract. The numerical solution of the time dependent wave equation in an unbounded domain generall...
State-of-the-art computational methods for linear acoustics are reviewed. The equations of linear ac...
Solution of the wave equation using techniques such as finite difference or finite element methods c...
ABSTRACTWhen modeling wave propagation, truncation of the computational domain to a manageable size ...
Recently introduced non-reflecting boundary conditions are numerically exact: the solution on a give...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
Simulations of wave propagation in the Earth usually require truncation of a larger domain to the re...
International audienceThe calculation of wave radiation in exterior domains by finite element method...
International audienceWe deal with the finite element solution of 3D time-harmonic acoustic wave pro...
A boundary integral formulation for the solution of the Helmholtz equation is developed in which all...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
The propagation of sound under water is modeled by the wave equation. Under certain conditions, this...
The numerical solution of the time dependent wave equation in an unbounded domain generally leads to...
AbstractIf a nonconstant solution u of the Helmholtz equation exists on a bounded domain with u sati...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
Abstract. The numerical solution of the time dependent wave equation in an unbounded domain generall...
State-of-the-art computational methods for linear acoustics are reviewed. The equations of linear ac...
Solution of the wave equation using techniques such as finite difference or finite element methods c...
ABSTRACTWhen modeling wave propagation, truncation of the computational domain to a manageable size ...
Recently introduced non-reflecting boundary conditions are numerically exact: the solution on a give...
AbstractTo solve the Helmholtz equation in an infinite three-dimensional domain a spherical artifici...
Simulations of wave propagation in the Earth usually require truncation of a larger domain to the re...
International audienceThe calculation of wave radiation in exterior domains by finite element method...
International audienceWe deal with the finite element solution of 3D time-harmonic acoustic wave pro...
A boundary integral formulation for the solution of the Helmholtz equation is developed in which all...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
The propagation of sound under water is modeled by the wave equation. Under certain conditions, this...
The numerical solution of the time dependent wave equation in an unbounded domain generally leads to...
AbstractIf a nonconstant solution u of the Helmholtz equation exists on a bounded domain with u sati...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
Abstract. The numerical solution of the time dependent wave equation in an unbounded domain generall...
State-of-the-art computational methods for linear acoustics are reviewed. The equations of linear ac...
Solution of the wave equation using techniques such as finite difference or finite element methods c...