Titlebook: Asymptotic Analysis; J. D. Murray Textbook 1984 Springer Science+Business Media New York 1984 Approximation.Asymptotische Darstellung.Diff

intelligible

Applied Mathematical Scienceshttp://image.papertrans.cn/b/image/163771.jpg

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Ordnance

UTTER

Regurgitation

Foundations of Differential Calculusach of the books by Erdelyi (1956) and Jeffreys (1966) is devoted to ordinary differential equations. In the partial differential equation area the books by Van Dyke (1964) and Cole (1968)† are of importance in the particular area of asymptotic analysis called singular perturbation theory.

NICE

防水

Method of stationary phase, will be seen in §4.2 below, is in itself a valid reason for obtaining the asymptotic expansion. In §4.2 a brief introduction is given to dispersive wave motion which is of current interest and practical importance: the most exciting developments in the subject have appeared since about 1960.

镇压

Differential equations,ach of the books by Erdelyi (1956) and Jeffreys (1966) is devoted to ordinary differential equations. In the partial differential equation area the books by Van Dyke (1964) and Cole (1968)† are of importance in the particular area of asymptotic analysis called singular perturbation theory.

defeatist

Asymptotic expansions,ean one that is given in terms of functions whose properties are known or tabulated: Bessel functions, trigonometric functions, Legendre functions, exponentials, and so on are typical examples. Such a solution may not be particularly useful, however, from either a computational or analytical point o

BROTH

,Laplace’s method for integrals,res but it is rather limited in its applicability. The procedure is essentially to integrate by parts and then show that the resulting series is asymptotic by estimating the remainder which is in the form of an integral: this is exactly what was done in §1.1 to obtain (1.11) for Ei(.) as . → ∞. We i