Add to ORKGIn this paper we develop numerical approximations of the wave equation in mixed form supplemented with non-reflecting boundary conditions (NRBCs) of Sommerfeld-type on artificial boundaries for truncated domains. We consider three different variational forms for this problem, depending on the functional space for the solution, in particular, in what refers to the regularity required on artificial boundaries. Then, stabilized finite element methods that can mimic these three functional settings are described. Stability and convergence analyses of these stabilized formulations including the NRBC are presented. Additionally, numerical convergence test are evaluated for various polynomial interpolations, stabilization methods and variational fo...
The problem of modeling acoustic waves scattered by an object with Neumann boundary condition is con...
AbstractThis paper presents a computational (finite element analysis) study for numerically simulati...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
Summary: When solving the wave equation in infinite regions using finite ele-ment methods, the domai...
A modied version of an exact Non-re ecting Boundary Condition (NRBC) rst derived by Grote and Kelle...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
The article of record as published by be found at http://dx.doi.org/10.1016/j.jcp.2015.09.048In comp...
this paper, we couple fast nonreflecting boundary conditions, developed in [3] for spherical and cyl...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
We consider two aspects of non-reflecting boundaryconditions for wave propagation problems. First we...
Using the framework introduced by Rowley and Colonius [14] we construct a dis-cretely non-reflecting...
Recently introduced non-reflecting boundary conditions are numerically exact: the solution on a give...
ABSTRACTWhen modeling wave propagation, truncation of the computational domain to a manageable size ...
AbstractWe develop high-order, non-reflecting boundary equations for a semidiscrete approximation of...
The problem of modeling acoustic waves scattered by an object with Neumann boundary condition is con...
AbstractThis paper presents a computational (finite element analysis) study for numerically simulati...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
Summary: When solving the wave equation in infinite regions using finite ele-ment methods, the domai...
A modied version of an exact Non-re ecting Boundary Condition (NRBC) rst derived by Grote and Kelle...
Abstract: We propose artificial boundary conditions for the wave equation considered outsi...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
The article of record as published by be found at http://dx.doi.org/10.1016/j.jcp.2015.09.048In comp...
this paper, we couple fast nonreflecting boundary conditions, developed in [3] for spherical and cyl...
AbstractTo solve the time-dependent wave equation in an infinite two (three) dimensional domain a ci...
We consider two aspects of non-reflecting boundaryconditions for wave propagation problems. First we...
Using the framework introduced by Rowley and Colonius [14] we construct a dis-cretely non-reflecting...
Recently introduced non-reflecting boundary conditions are numerically exact: the solution on a give...
ABSTRACTWhen modeling wave propagation, truncation of the computational domain to a manageable size ...
AbstractWe develop high-order, non-reflecting boundary equations for a semidiscrete approximation of...
The problem of modeling acoustic waves scattered by an object with Neumann boundary condition is con...
AbstractThis paper presents a computational (finite element analysis) study for numerically simulati...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...