| Applications of Pade' Approximation Theory in Fluid Dynamics Contributor(s): Pozzi, Amilcare (Author) |
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ISBN: 9810214146 ISBN-13: 9789810214142 Publisher: World Scientific Publishing Company OUR PRICE: $94.05 Product Type: Hardcover Published: March 1994 |
| Additional Information |
| BISAC Categories: - Technology & Engineering | Hydraulics - Mathematics | Applied |
| Dewey: 532.050 |
| LCCN: 93037547 |
| Series: Advances in Mathematics for Applied Sciences |
| Physical Information: 252 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: Although Pad presented his fundamental paper at the end of the last century, the studies on Pad 's approximants only became significant in the second part of this century.Pad procedure is related to the theory of continued fractions, and some convergence theorems can be expressed only in terms of continued fractions. Further, Pad approximants have some advantages of practical applicability with respect to the continued-fraction theory. Moreover, as Chisholm notes, a given power series determines a set of approximants which are usually unique, whereas there are many ways of writing an associated continued fraction.The principal advantage of Pad approximants with respect to the generating Taylor series is that they provide an extension beyond the interval of convergence of the series.Pad approximants can be applied in many parts of fluid-dynamics, both in steady and in nonsteady flows, both in incompressible and in compressible regimes.This book is divided into four parts. The first one deals with the properties of the Pad approximants that are useful for the applications and illustrates, with the aid of diagrams and tables, the effectiveness of this technique in the field of applied mathematics. The second part recalls the basic equations of fluid-dynamics (those associated with the names of Navier-Stokes, Euler and Prandtl) and gives a quick derivation of them from the general balance equation. The third shows eight examples of the application of Pad approximants to steady flows, also taking into account the influence of the coupling of heat conduction in the body along which a fluid flows with conduction and convection in the fluid itself. The fourth part considers two examples of the application of Pad approximants to unsteady flows. |