» » Group Invariance in Engineering Boundary Value Problems ISBN: 3540961283
Pages: 224 pages
Category: Mathematics
Publisher: Springer-Verlag Berlin and Heidelberg GmbH & Co. K (December 31, 1985)
Rating: 4.8
Formats: azw mbr doc lit
FB2 size: 1661 kb | EPUB size: 1212 kb | DJVU size: 1720 kb
Sub: Math

Transformation of a Boundary Value Problem to an Initial Value Problem. Bibliographic Information. Group Invariance in Engineering Boundary Value Problems.

Transformation of a Boundary Value Problem to an Initial Value Problem.

tion of a Boundary Value Problem to an Initial Value Problem Chapter 1 INTRODUCTION AND GENERAL OUTLINE Physical problems in engineering science are often described by dif­ ferential models either linear or nonlinear

tion of a Boundary Value Problem to an Initial Value Problem. 157 . Blasius Equation in Boundary Layer Flow. Longitudinal Impact of Nonlinear Viscoplastic Rods. Chapter 1 INTRODUCTION AND GENERAL OUTLINE Physical problems in engineering science are often described by dif­ ferential models either linear or nonlinear. There is also an abundance of transformations of various types that appear in the literature of engineer­ ing and mathematics that are generally aimed at obtaining some sort of simplification of a differential model.

Start by marking Group Invariance in Engineering Boundary Value Problems as Want to Read . Chapter 1 INTRODUCTION AND GENERAL OUTLINE Physical problems in engineering science are often described by dif- ferential models either linear or nonlinear

Start by marking Group Invariance in Engineering Boundary Value Problems as Want to Read: Want to Read savin. ant to Read. Chapter 1 INTRODUCTION AND GENERAL OUTLINE Physical problems in engineering science are often described by dif- ferential models either linear or nonlinear. There is also an abundance of transformations of various types that appear in the literature of engineer- ing and mathematics that are generally aimed at obtaining some sort of simplification of a differential model.

In this problem a boundary condition at infinity is imposed which is not suitable for a. .

In book II of Newton's "Principia Mathematica" of 1687 several applicative problems are introduced and solved. There, we can find the formulation of the first calculus of variations problem that leads to the first free boundary problem of history. 163 . Summary Chapter 1 INTRODUCTION AND GENERAL OUTLINE Physical problems in engineering science are often described by dif­ ferential models either linear or nonlinear.

Book Publishing WeChat. org) Lie-group method is applied for determining the symmetry reductions for the governing. ABSTRACT: This work deals with the boundary layer flow and heat transfer of an electrically conducting viscous fluid over a stretching sheet. Lie-group method is applied for determining the symmetry reductions for the governing equations by reducing the number of independent variables in the given system of partial differential equations by one, leading to a system of non-linear ordinary differential equation. The resulting system is then solved numerically using shooting method coupled with Runge-Kutta scheme.

Boundary value problems, Transformation groups.

Group invariance in engineering boundary value problems. 1 2 3 4 5. Want to Read. Are you sure you want to remove Group invariance in engineering boundary value problems from your list? Group invariance in engineering boundary value problems. Published 1985 by Springer-Verlag in New York, Berlin Written in English. Boundary value problems, Transformation groups.

Seshadri, R. Group Invariance in Engineering Boundary Value Problems, R. Seshadri, T. Y. Na. – Springer-Verlag, New York In. 1985.

Firstly, the multi-parameter symmetry of a given boundary value problem for nonlinear partial differential equation is determined based . R. Seshadri, Tolokontsev Na.

Firstly, the multi-parameter symmetry of a given boundary value problem for nonlinear partial differential equation is determined based on differential characteristic set algorithm. Secondly, by using the symmetry, the boundary value problem for nonlinear partial differential equation is reduced to an initial value problem of the original differential equation. Finally, we numerically solve the initial value problem of the original differential equations by using Runge-Kutta method.