This thesis was submitted for the award of Doctor of Philosophy and was awarded by Brunel University LondonThe Wavelet Finite Element Method (WFEM) involves combining the versatile wavelet analysis with the classical Finite Element Method (FEM) by utilizing the wavelet scaling functions as interpolating functions; providing an alternative to the conventional polynomial interpolation functions used in classical FEM. Wavelet analysis as a tool applied in WFEM has grown in popularity over the past decade and a half and the WFEM has demonstrated potential prowess to overcome some difficulties and limitations of FEM. This is particular for problems with regions of the solution domain where the gradient of the field variables are expected to vary...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
In the last years, applying wavelets analysis has called the attention in a wide variety of practica...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
The objective of this paper is to develop a family of wavelet-based finite elements for structural r...
The traditional finite element method (TFEM) of analysis requires a large number of elements to have...
AbstractAn important property of wavelet multiresolution analysis is the capability to represent fun...
This paper presents a final report on Wavelet and Multiresolution Analysis for Finite Element Networ...
[[abstract]]A spline wavelets element method that combines the versatility of the finite element met...
This paper proposes a wavelet based numerical method for the solution of elastoplastic problem. The ...
A stochastic finite element method based on B-spline wavelet on the interval (BSWI-SFEM) is present...
In this paper, a spectrally formulated wavelet finite element is developed and is used to study coup...
AbstractA new second-generation wavelet (SGW)-based finite element method is proposed for solving pa...
Taking advantage of the unique multi-scale and localization features of wavelet finite element model...
The paper is a brief introduction into the multi-resolution wavelet analysis. The main objective of ...
This paper reports the extraordinary ability of the wavelet decomposition for vibration analyses und...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
In the last years, applying wavelets analysis has called the attention in a wide variety of practica...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
The objective of this paper is to develop a family of wavelet-based finite elements for structural r...
The traditional finite element method (TFEM) of analysis requires a large number of elements to have...
AbstractAn important property of wavelet multiresolution analysis is the capability to represent fun...
This paper presents a final report on Wavelet and Multiresolution Analysis for Finite Element Networ...
[[abstract]]A spline wavelets element method that combines the versatility of the finite element met...
This paper proposes a wavelet based numerical method for the solution of elastoplastic problem. The ...
A stochastic finite element method based on B-spline wavelet on the interval (BSWI-SFEM) is present...
In this paper, a spectrally formulated wavelet finite element is developed and is used to study coup...
AbstractA new second-generation wavelet (SGW)-based finite element method is proposed for solving pa...
Taking advantage of the unique multi-scale and localization features of wavelet finite element model...
The paper is a brief introduction into the multi-resolution wavelet analysis. The main objective of ...
This paper reports the extraordinary ability of the wavelet decomposition for vibration analyses und...
Transform methods are some of those methods which are able to solve certain difficult ordinary and p...
In the last years, applying wavelets analysis has called the attention in a wide variety of practica...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...