A False Position
Author : Baillie Reynolds
Publisher :
Page : 286 pages
File Size : 50,55 MB
Release : 1912
Category :
ISBN :
Author : Baillie Reynolds
Publisher :
Page : 286 pages
File Size : 50,55 MB
Release : 1912
Category :
ISBN :
Author : Mrs. Baillie Reynolds
Publisher :
Page : 286 pages
File Size : 18,10 MB
Release : 1900
Category :
ISBN :
Author : Gertrude M. Reynolds
Publisher :
Page : 366 pages
File Size : 40,46 MB
Release : 1887
Category :
ISBN :
Author : Mrs. Baillie Reynolds
Publisher :
Page : 366 pages
File Size : 45,88 MB
Release : 1887
Category :
ISBN :
Author : Charles BULLOCK (B.D.)
Publisher :
Page : 56 pages
File Size : 26,61 MB
Release : 1861
Category :
ISBN :
Author : A. M. Monro
Publisher :
Page : pages
File Size : 18,22 MB
Release : 1901
Category :
ISBN :
Author : afterwards REYNOLDS ROBINS (Gertrude M.)
Publisher :
Page : 348 pages
File Size : 35,7 MB
Release : 1909
Category :
ISBN :
Author : Gertrude Minnie Reynolds (formerly Robins.)
Publisher :
Page : pages
File Size : 45,62 MB
Release : 1909
Category :
ISBN :
Author : afterwards REYNOLDS ROBINS (Gertrude M.)
Publisher :
Page : pages
File Size : 43,19 MB
Release : 1887
Category :
ISBN :
Author : Shijun Liao
Publisher : CRC Press
Page : 335 pages
File Size : 39,2 MB
Release : 2003-10-27
Category : Mathematics
ISBN : 1135438293
Solving nonlinear problems is inherently difficult, and the stronger the nonlinearity, the more intractable solutions become. Analytic approximations often break down as nonlinearity becomes strong, and even perturbation approximations are valid only for problems with weak nonlinearity. This book introduces a powerful new analytic method for nonlinear problems-homotopy analysis-that remains valid even with strong nonlinearity. In Part I, the author starts with a very simple example, then presents the basic ideas, detailed procedures, and the advantages (and limitations) of homotopy analysis. Part II illustrates the application of homotopy analysis to many interesting nonlinear problems. These range from simple bifurcations of a nonlinear boundary-value problem to the Thomas-Fermi atom model, Volterra's population model, Von Karman swirling viscous flow, and nonlinear progressive waves in deep water. Although the homotopy analysis method has been verified in a number of prestigious journals, it has yet to be fully detailed in book form. Written by a pioneer in its development, Beyond Pertubation: Introduction to the Homotopy Analysis Method is your first opportunity to explore the details of this valuable new approach, add it to your analytic toolbox, and perhaps make contributions to some of the questions that remain open.