Introduction to Partial Differential Equations
By: Rao, K. Sankara.
Publisher: New Delhi PHI Learning 2009Edition: 2nd.Description: 430 p. | Binding - Paperback | 23.6X17.5.ISBN: 81-203-2733-7.Subject(s): MathematicsHumanities and Applied Sciences | PARTIAL DIFFERENTIAL EQUATIONS OF FIRST ORDER,FUNDAMENTAL CONCEPTS,ELLIPTIC DIFFERENTIAL EQUATIONS, PARABOLIC DIFFERENTIAL EQUATIONS, HYPERBOLIC DIFFERENTIAL EQUATIONS, GREEN’S FUNCTION,FOURIER TRANSFORM METHODSLAPLACE TRANSFORM METHODSDDC classification: 515.353 Online resources: Click here to access online Summary: This comprehensive and well-organized book, now in its Third Edition, continues to provide the students with the fundamental concepts, the underlying principles, various well-known mathematical techniques and methods such as Laplace and Fourier transform techniques, the variable separable method, and Green’s function method to solve partial differential equations. The text is supported by a number of worked-out examples and miscellaneous examples to enable the students to assimilate the fundamental concepts and the techniques for solving partial differential equations with various initial and boundary conditions. Besides, chapter-end exercises are also provided with hints to reinforce the students’ skill. It is designed primarily to serve as a textbook for senior undergraduate and postgraduate students pursuing courses in applied mathematics, physics and engineering. Students appearing in various competitive examinations like NET, GATE, and the professionals working in scientific R&D organizations would also find this book both stimulating and highly useful.| Item type | Current location | Collection | Call number | Status | Date due | Barcode | Item holds |
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Text Books
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School of Engineering & Technology | Reference | 515.353 RAO (Browse shelf) | Not For Loan | E0123 |
This comprehensive and well-organized book, now in its Third Edition, continues to provide the students with the fundamental concepts, the underlying principles, various well-known mathematical techniques and methods such as Laplace and Fourier transform techniques, the variable separable method, and Green’s function method to solve partial differential equations.
The text is supported by a number of worked-out examples and miscellaneous examples to enable the students to assimilate the fundamental concepts and the techniques for solving partial differential equations with various initial and boundary conditions. Besides, chapter-end exercises are also provided with hints to reinforce the students’ skill.
It is designed primarily to serve as a textbook for senior undergraduate and postgraduate students pursuing courses in applied mathematics, physics and engineering. Students appearing in various competitive examinations like NET, GATE, and the professionals working in scientific R&D organizations would also find this book both stimulating and highly useful.
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