Add to ORKGLie groups approach in differential equations was a breakthrough subject in the late nineteenth century. Sophus Lie, a Norwegian mathematician, introduced the systematic approach to study the solutions of differential equations. The main goal of this thesis is to study, using Lie\u27s approach, the Euler-Bernoulli beam equation subject to swelling force, the fourth-order nonlinear differential equation used to describe the beam deflection under the swelling force. In particular, we will classify the symmetry groups of this equation, obtain several reductions, and demonstrate both analytical and numerical solutions
Abstract: The formal models of physical systems are typically written in terms of differential equat...
In this dissertation the first problem of Stoke’s for the rotating flow of third grade fluid will be...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
We study a dynamic fourth-order Euler-Bernoulli partial differential equation having a constant elas...
Today engineering and science researchers routinely confront problems in mathematical modeling invol...
AbstractSymmetries of differential equations play very important role in understanding of their prop...
The paper presents the solution of a fourth order differential equation with various coefficients oc...
In this paper we make a Lie symmetry analysis of a generalized nonlinear beam equation with both sec...
International audienceStudying structural elements undergoing transverse vibration is crucial for sc...
instability. Due to the complexity of interactions between expansive solid and solid-liquid equilibr...
The dynamic behavior of uniform Bernoulli-Euler beam with elastically supported boundary conditions ...
The formal models of physical systems are typically written in terms of differential equations. A tr...
The formal models of physical systems are typically written in terms of differential equations. A tr...
Degree awarded with distinction on 6 December 1995. A research report submitted to the Faculty of S...
The Lie symmetry analysis for the study of a 1+n fourth-order Schrödinger equation inspired by the m...
Abstract: The formal models of physical systems are typically written in terms of differential equat...
In this dissertation the first problem of Stoke’s for the rotating flow of third grade fluid will be...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
We study a dynamic fourth-order Euler-Bernoulli partial differential equation having a constant elas...
Today engineering and science researchers routinely confront problems in mathematical modeling invol...
AbstractSymmetries of differential equations play very important role in understanding of their prop...
The paper presents the solution of a fourth order differential equation with various coefficients oc...
In this paper we make a Lie symmetry analysis of a generalized nonlinear beam equation with both sec...
International audienceStudying structural elements undergoing transverse vibration is crucial for sc...
instability. Due to the complexity of interactions between expansive solid and solid-liquid equilibr...
The dynamic behavior of uniform Bernoulli-Euler beam with elastically supported boundary conditions ...
The formal models of physical systems are typically written in terms of differential equations. A tr...
The formal models of physical systems are typically written in terms of differential equations. A tr...
Degree awarded with distinction on 6 December 1995. A research report submitted to the Faculty of S...
The Lie symmetry analysis for the study of a 1+n fourth-order Schrödinger equation inspired by the m...
Abstract: The formal models of physical systems are typically written in terms of differential equat...
In this dissertation the first problem of Stoke’s for the rotating flow of third grade fluid will be...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...