In this paper, a novel wavelet based spectral finite element is developed for studying elastic wave propagation in 1-D connected waveguides. First the partial differential wave equation is converted to simultaneous ordinary differential equations (ODEs) using Daubechies wavelet approximation in time. These ODEs are then solved using finite element (FE) technique by deriving the exact interpolating function in the transformed domain. Spectral element captures the exact mass distribution and thus the system size required is very much smaller then conventional FE. The localized nature of the compactly supported Daubechies wavelet allows easy imposition of initial-boundary values. This circumvents several disadvantages of the conventional spect...
In this paper, a 2D wavelet-based spectral finite element (WSFE) is developed for a anisotropic lami...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
Wave propagation analysis in 1-D and 2-D composite structures is performed efficiently and accuratel...
In this paper, a novel wavelet based spectral finite element is developed for studying elastic wave ...
In this paper, a spectrally formulated wavelet finite element is developed and is used not only to s...
In this paper, a spectrally formulated wavelet finite element is developed and is used to study coup...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
We study transient wave propagation in a pressure loaded isotropic cylinder under axisymmetric condi...
Ultrasonic-guided wave propagation in stiffened composite panels is modeled using the wavelet spectr...
In this paper, a 2-D Wavelet based Spectral Finite Element (WSFE) is developed and is used to study ...
In this paper, a 2-D Wavelet based Spectral Finite Element (WSFE) is developed and is used to study ...
An analytical-numerical method, based on the use of wavelet spectral finite elements (WSFE), is pres...
In this paper, spectral finite element is formulated for an Euler-Bernoulli beam with through-width ...
Structural spectral elements are formulated using the analytical solution of the applicable elastody...
In this paper a 2D wavelet-based spectral finite element (WSFE) is developed for a anisotropic lamin...
In this paper, a 2D wavelet-based spectral finite element (WSFE) is developed for a anisotropic lami...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
Wave propagation analysis in 1-D and 2-D composite structures is performed efficiently and accuratel...
In this paper, a novel wavelet based spectral finite element is developed for studying elastic wave ...
In this paper, a spectrally formulated wavelet finite element is developed and is used not only to s...
In this paper, a spectrally formulated wavelet finite element is developed and is used to study coup...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
We study transient wave propagation in a pressure loaded isotropic cylinder under axisymmetric condi...
Ultrasonic-guided wave propagation in stiffened composite panels is modeled using the wavelet spectr...
In this paper, a 2-D Wavelet based Spectral Finite Element (WSFE) is developed and is used to study ...
In this paper, a 2-D Wavelet based Spectral Finite Element (WSFE) is developed and is used to study ...
An analytical-numerical method, based on the use of wavelet spectral finite elements (WSFE), is pres...
In this paper, spectral finite element is formulated for an Euler-Bernoulli beam with through-width ...
Structural spectral elements are formulated using the analytical solution of the applicable elastody...
In this paper a 2D wavelet-based spectral finite element (WSFE) is developed for a anisotropic lamin...
In this paper, a 2D wavelet-based spectral finite element (WSFE) is developed for a anisotropic lami...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
Wave propagation analysis in 1-D and 2-D composite structures is performed efficiently and accuratel...