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Sturm-Liouville Problems

Ronald B. Guenther | John W Lee
€210.80
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A01=John W Lee
A01=Ronald B. Guenther
advanced eigenvalue problem methods
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Age Group_Uncategorized
Approximate Eigenvalues
Author_John W Lee
Author_Ronald B. Guenther
automatic-update
Bessel's Equation
boundary value analysis
Category1=Non-Fiction
Category=PBKA
Category=PBM
Category=PBT
Category=PBW
COP=United Kingdom
Damped Wave Equation
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eigenfunction approximation
Eigenfunction Expansion
Eigenvalue Problem
Elastic Energy
Elastic Potential Energy
eq_isMigrated=2
eq_nobargain
Euclidean Geometry
Euclidean Spaces
Euler Buckling
Fundamental Frequency
Green's Function
Green's functions
Heat Equation
Initial Boundary
integral equations
Integral Operators
John W. Lee
Language_English
mathematical physics applications
Normal Modes
numerical implementation
Ordinary Differential Equations
PA=Available
Partial Differential Equation
partial differential equations
Price_€100 and above
PS=Active
science and engineering applications
Separated Boundary Conditions
Shooting Method
Shooting methods
Singular Sturm Liouville Problems
softlaunch
Solution Formula
spectral theory
Sturm Liouville Boundary
Sturm Liouville Differential Equation
Sturm Liouville Eigenvalue Problem
Sturm Liouville Problems
variational techniques
Virtual Motion
Wave Equation

Product details

  • ISBN 9781138345430
  • Weight: 914g
  • Dimensions: 178 x 254mm
  • Publication Date: 08 Nov 2018
  • Publisher: Taylor & Francis Ltd
  • Publication City/Country: GB
  • Product Form: Hardback
  • Language: English
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Description

Sturm-Liouville problems arise naturally in solving technical problems in engineering, physics, and more recently in biology and the social sciences. These problems lead to eigenvalue problems for ordinary and partial differential equations. Sturm-Liouville Problems: Theory and Numerical Implementation addresses, in a unified way, the key issues that must be faced in science and engineering applications when separation of variables, variational methods, or other considerations lead to Sturm-Liouville eigenvalue problems and boundary value problems.
About John W Lee | Ronald B. Guenther

Ronald B. Guenther is an Emeritus Professor in the Department of Mathematics at Oregon State University. His research interests include fluid mechanics and mathematically modelling deterministic systems and the ordinary and partial differential equations that arise from these models.

John W. Lee is an Emeritus Professor in the Department of Mathematics at Oregon State University. His research interests include differential equations, especially oscillatory properties of problems of Sturm-Liouville type and related approximation theory, and integral equations.

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