A First Look at Perturbation Theory
(eBook)
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Format
eBook
Language
English
ISBN
9780486315584
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Citations
APA Citation, 7th Edition (style guide)
James G. Simmonds., James G. Simmonds|AUTHOR., & James E. Mann|AUTHOR. (2013). A First Look at Perturbation Theory . Dover Publications.
Chicago / Turabian - Author Date Citation, 17th Edition (style guide)James G. Simmonds, James G. Simmonds|AUTHOR and James E. Mann|AUTHOR. 2013. A First Look At Perturbation Theory. Dover Publications.
Chicago / Turabian - Humanities (Notes and Bibliography) Citation, 17th Edition (style guide)James G. Simmonds, James G. Simmonds|AUTHOR and James E. Mann|AUTHOR. A First Look At Perturbation Theory Dover Publications, 2013.
MLA Citation, 9th Edition (style guide)James G. Simmonds, James G. Simmonds|AUTHOR, and James E. Mann|AUTHOR. A First Look At Perturbation Theory Dover Publications, 2013.
Note! Citations contain only title, author, edition, publisher, and year published. Citations should be used as a guideline and should be double checked for accuracy. Citation formats are based on standards as of August 2021.
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Grouping Information
| Grouped Work ID | ae555698-37bc-e231-bbae-927d61b2731f-eng |
|---|---|
| Full title | first look at perturbation theory |
| Author | simmonds james g |
| Grouping Category | book |
| Last Update | 2022-10-18 20:50:33PM |
| Last Indexed | 2024-04-27 04:05:37AM |
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[synopsis] => Undergraduates in engineering and the physical sciences receive a thorough introduction to perturbation theory in this useful and accessible text. Students discover methods for obtaining an approximate solution of a mathematical problem by exploiting the presence of a small, dimensionless parameter - the smaller the parameter, the more accurate the approximate solution. Knowledge of perturbation theory offers a twofold benefit: approximate solutions often reveal the exact solution's essential dependence on specified parameters; also, some problems resistant to numerical solutions may yield to perturbation methods. In fact, numerical and perturbation methods can be combined in a complementary way. The text opens with a well-defined treatment of finding the roots of polynomials whose coefficients contain a small parameter. Proceeding to differential equations, the authors explain many techniques for handling perturbations that reorder the equations or involve an unbounded independent variable. Two disparate practical problems that can be solved efficiently with perturbation methods conclude the volume. Written in an informal style that moves from specific examples to general principles, this elementary text emphasizes the "why" along with the "how"; prerequisites include a knowledge of one-variable calculus and ordinary differential equations. This newly revised second edition features an additional appendix concerning the approximate evaluation of integrals.
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