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A compendium of partial differential equation models : method of lines analysis with Matlab / William E. Schiesser, Graham W. Griffiths.

EBSCOhost Academic eBook Collection (North America) Available online

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Format:
Book
Author/Creator:
Schiesser, W. E., author.
Griffiths, Graham W., author.
Language:
English
Subjects (All):
MATLAB.
Differential equations, Partial--Mathematical models.
Differential equations, Partial.
Physical Description:
1 online resource (xiii, 474 pages) : digital, PDF file(s).
Place of Publication:
Cambridge : Cambridge University Press, 2009.
Language Note:
English
Summary:
Mathematical modelling of physical and chemical systems is used extensively throughout science, engineering, and applied mathematics. To use mathematical models, one needs solutions to the model equations; this generally requires numerical methods. This book presents numerical methods and associated computer code in Matlab for the solution of a spectrum of models expressed as partial differential equations (PDEs). The authors focus on the method of lines (MOL), a well-established procedure for all major classes of PDEs, where the boundary value partial derivatives are approximated algebraically by finite differences. This reduces the PDEs to ordinary differential equations (ODEs) and makes the computer code easy to understand, implement, and modify. Also, the ODEs (via MOL) can be combined with any other ODEs that are part of the model (so that MOL naturally accommodates ODE/PDE models). This book uniquely includes a detailed line-by-line discussion of computer code related to the associated PDE model.
Contents:
An introduction to the method of lines
A one-dimensional, linear partial differential equation
Green's function analysis
Two nonlinear, variable-coeffcient, inhomogeneous partial differential equations
Euler, Navier Stokes, and Burgers equation
The cubic Schrödinger equation
The Korteweg-deVries equation
The linear wave equation
Maxwell's equations
Elliptic partial differential equations: Laplace's equation
Three-dimensional partial differential equation
Partial differential equation with a mixed partial derivative
Simultaneous, nonlinear, two-dimensional partial differential equations in cylindrical coordinates
Diffusion equation in spherical coordinates
Appendixes: 1. Partial differential equations from conservation principles: the Anisotropic diffusion equation
2. Order conditions for finite-difference approximations
3. Analytical solution of nonlinear, traveling wave partial differential equations
4. Implementation of time-varying boundary conditions
5. The differentiation in space subroutines library
6. Animating simulation results.
Notes:
Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Includes bibliographical references and index.
ISBN:
1-107-19205-6
0-511-50496-9
0-511-50853-0
0-511-50919-7
0-511-57627-7
0-511-50710-0
OCLC:
437110020

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