PART I BASIC IDEAS: Introduction. Illustrative Description. Systematic Description. Relations to Some Previous Analytic Methods. Advantages, Limitations, and Open Questions. PART II APPLICATIONS: Simple Bifurcation of a Nonlinear Problem. Multiple Solutions of a Nonlinear Problem. Nonlinear Eigenvalue Problem. Thomas-Fermi Atom Model. Volterra's Population Model. Free Oscillation Systems with Odd Nonlinearity. Free Oscillation Systems with Quadratic Nonlinearity. Limit Cycle in a Multidimensional System. Blasius' Viscous Flow. Boundary-layer Flow with Exponential Property. Boundary-layer Flow with Algebraic Property. Von Kármán Swirling Flow. Nonlinear Progressive Waves in Deep Water. BIBLIOGRAPHY. INDEX
"The author has invested a great amount of effort into determining
all the power series and computing the functions depicted in the
figures."
-Mathematical Reviews, Issue 2005h
"… an excellent reference to researchers, engineers, and interested
individuals in helping them tackle nonlinear problems in an
analytical fashion…a good subject index and an outstanding list of
bibliography with 136 references cited…very well written and is
relatively easy to follow to the mathematically literate person. I
highly recommend that it be acquired by interested individuals and
libraries throughout."
-Applied Mathematics Review, Vol. 57, No. 5, September 2004
"This monograph offers the opportunity to explore the details of
the valuable new approach both in the theory and on many
interesting examples. It will be useful to specialists working in
applied nonlinear analysis."
-Zentralblatt MATH 1051
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