Solving equations with physical understanding J.R. Acton & P.T. Squire

By: Acton, J.R & Squire, P.T | Squire, P.TMaterial type: Text

TextPublication details: Bristol Adam Hilger 1985 Description: x,219pISBN: 0852747993 (PB)Subject(s): mathematical physicsDDC classification: 14.09

Contents:

Mathematical preliminaries Estimation of time constants by exponential trial functions Estimation of length constants by exponential trial functions Parabolic trial functions The QSTF method for unforced oscillations Forced oscillation and resonance Exact solution of partial differential equations Estimation of lowest eigenvalues by parabolic trial functions The QSTF method for conduction and diffusion equations Extending the QSTF method

Summary: In creating mathematical models of real processes, scientists, engineers and students frequently encounter differential equations whose exact solutions are necessarily complicated and are normally solvable only by computer or through complex formal mathematics. This practical book demonstrates how approximate methods may be used to minimize these mathematical difficulties, giving the reader physical understanding both of the solution process and the final result. Intended for undergraduates and graduate students, teachers of physics, engineering and other applied sciences, professional and applied scientists and engineers.

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Books	TIFR CAM Library	14.09 ACTO (Browse shelf(Opens below))		Available		M3608

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Mathematical preliminaries
Estimation of time constants by exponential trial functions
Estimation of length constants by exponential trial functions
Parabolic trial functions
The QSTF method for unforced oscillations
Forced oscillation and resonance
Exact solution of partial differential equations
Estimation of lowest eigenvalues by parabolic trial functions
The QSTF method for conduction and diffusion equations
Extending the QSTF method

In creating mathematical models of real processes, scientists, engineers and students frequently encounter differential equations whose exact solutions are necessarily complicated and are normally solvable only by computer or through complex formal mathematics. This practical book demonstrates how approximate methods may be used to minimize these mathematical difficulties, giving the reader physical understanding both of the solution process and the final result. Intended for undergraduates and graduate students, teachers of physics, engineering and other applied sciences, professional and applied scientists and engineers.

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