This paper presents a framework for implementing a novel Perfectly Matching Layer and Infinite Element (PML+IE) combination boundary condition for unbounded elastic wave problems in the time domain. To achieve this, traditional hexahedral finite elements are used to model wave propagation in the inner domain and infinite element test functions are implemented in the exterior domain. Two alternative implementations of the PML formulation are studied: the case with constant stretching in all three dimensions and the case with spatially dependent stretching along a single direction. The absorbing ability of the PML+IE formulation is demonstrated by the favourable comparison with the reflection coefficient for a plane wave incident on the bound...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
We propose Perfectly Matched Layers (PMLs) for flexural waves in plate structures. The analytical mo...
Perfectly matched layers (PML) are a well-developed method for simulating wave propagation in unboun...
As an absorbing boundary in infinite domain problems, the perfectly matched layer (PML) is introduce...
Abstract The multiaxial perfectly matched layer (M-PML) is a stable and effective nonreflecting boun...
One approach to the numerical solution of a wave equation on an unbounded domain uses a bounded doma...
International audienceThis review article revisits and outlines the perfectly matched layer (PML) me...
A method is presented for application of the perfectly matched layer (PML) absorbing boundary condit...
An adaptive finite element method is presented for the elastic scattering of a time-harmonic plane w...
Abstract. We consider the application of a perfectly matched layer (PML) technique to approximate so...
The perfectly matched layer (PML) has recently been introduced by Berenger as a material absorbing b...
Following the major evolution of computers that provided the possibility of using numerical methods ...
The article of record as published by be found at http://dx.doi.org/10.1016/j.jcp.2015.09.048In comp...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
A general convolutional version of perfectly matched layer (PML) formulation for second-order wave e...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
We propose Perfectly Matched Layers (PMLs) for flexural waves in plate structures. The analytical mo...
Perfectly matched layers (PML) are a well-developed method for simulating wave propagation in unboun...
As an absorbing boundary in infinite domain problems, the perfectly matched layer (PML) is introduce...
Abstract The multiaxial perfectly matched layer (M-PML) is a stable and effective nonreflecting boun...
One approach to the numerical solution of a wave equation on an unbounded domain uses a bounded doma...
International audienceThis review article revisits and outlines the perfectly matched layer (PML) me...
A method is presented for application of the perfectly matched layer (PML) absorbing boundary condit...
An adaptive finite element method is presented for the elastic scattering of a time-harmonic plane w...
Abstract. We consider the application of a perfectly matched layer (PML) technique to approximate so...
The perfectly matched layer (PML) has recently been introduced by Berenger as a material absorbing b...
Following the major evolution of computers that provided the possibility of using numerical methods ...
The article of record as published by be found at http://dx.doi.org/10.1016/j.jcp.2015.09.048In comp...
The presence of wave motion is the defining feature in many fields of application,such as electro-ma...
A general convolutional version of perfectly matched layer (PML) formulation for second-order wave e...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
We propose Perfectly Matched Layers (PMLs) for flexural waves in plate structures. The analytical mo...
Perfectly matched layers (PML) are a well-developed method for simulating wave propagation in unboun...