A technique is presented whereby numerical calculations of vibration modes can be improved. The paper looks at the classical two‐dimensional wave equation using finite difference approximations. Analysis of the numerical dispersion of the approximations is used to develop a correction method. In general the numerical dispersion is dependent upon both the frequency and the direction of a wave, but if a 9‐point formula is used the directional dependence is much reduced. This enables correction factors to be obtained using only the frequency of a vibration mode. The method was tested on the vibration of a square membrane and of an L‐shaped region; in both cases a marked improvement in accuracy was obtained, at very little computational cost.</...
In modelling of wave propagation by finite element method, both the spatial and temporal discretizat...
Numerical modeling of wave propagation is es-sential for a large number of applied problems in acous...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
A technique is presented whereby numerical calculations of vibration modes can be improved. The pape...
A technique is presented whereby the standard finite element approximations used in vibration analys...
Thesis (Ph.D.)--University of Washington, 2015Finite Difference (FD) schemes have been used widely i...
Thesis (Master's)--University of Washington, 2012A new methodology was proposed in Finkelstein and K...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
The wave and finite element (WFE) method is a numerical approach to the calculation of the wave prop...
In this paper we develop an alternative method to derive finite difference approximations of derivat...
International audienceFor the evaluation of the dispersion relation of surface acoustic waves (SAW) ...
International audiencePeriodic structures exhibit very specific properties in terms of wave propagat...
An estimator for the error in the wave number is presented in the context of finite element approxim...
This paper presents a method of analysing the dispersion relation and field shape of any type of lin...
International audienceA numerical technique with the optimal coefficients of the stencil equation ha...
In modelling of wave propagation by finite element method, both the spatial and temporal discretizat...
Numerical modeling of wave propagation is es-sential for a large number of applied problems in acous...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...
A technique is presented whereby numerical calculations of vibration modes can be improved. The pape...
A technique is presented whereby the standard finite element approximations used in vibration analys...
Thesis (Ph.D.)--University of Washington, 2015Finite Difference (FD) schemes have been used widely i...
Thesis (Master's)--University of Washington, 2012A new methodology was proposed in Finkelstein and K...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
The wave and finite element (WFE) method is a numerical approach to the calculation of the wave prop...
In this paper we develop an alternative method to derive finite difference approximations of derivat...
International audienceFor the evaluation of the dispersion relation of surface acoustic waves (SAW) ...
International audiencePeriodic structures exhibit very specific properties in terms of wave propagat...
An estimator for the error in the wave number is presented in the context of finite element approxim...
This paper presents a method of analysing the dispersion relation and field shape of any type of lin...
International audienceA numerical technique with the optimal coefficients of the stencil equation ha...
In modelling of wave propagation by finite element method, both the spatial and temporal discretizat...
Numerical modeling of wave propagation is es-sential for a large number of applied problems in acous...
We investigated one-dimensional numerical dispersion curves and error behaviour of four finite-eleme...