HOME | BESTSELLERS | NEW RELEASES | PRICE WATCH | FICTION | BIOGRAPHIES | E-BOOKS |
+ PRICE WATCH
* Amazon pricing is not included in price watch
Numerical Analysis of Systems of Ordinary and Stochastic Differential Equations Book
This text deals with numerical analysis of systems of both ordinary and stochastic differential equations. The first chapter covers numerical solution problems of the Cauchy problem for stiff ordinary differential equations (ODE) systems by Rosenbrock-type methods (RTMs). Here, general solutions of consistency equations are obtained, which lead to the construction of RTMs from the first to the fourth order. The second chapter deals with statistical simulation problems of the solution of the Cauchy problem for stochastic differential equation (SDE) systems. The mean-square convergence theorem is considered, as well as Taylor expansions of numerical solutions. Also included are applications of numerical methods of SDE solutions to partial differential equations and to analysis and synthesis problems of automated control of stochastic systems. The book should be of interest to specialists in the fields of computational mathematics and physics, probability theory and atuomated control theory.Read More
from£67.80 | RRP: * Excludes Voucher Code Discount Also available Used from £20.61
- 9067642509
- 9789067642507
- S.S. Artemiev, T.A. Averina
- 1 June 1997
- VSP International Science Publishers
- Hardcover (Book)
- 176
As an Amazon Associate we earn from qualifying purchases. If you click through any of the links below and make a purchase we may earn a small commission (at no extra cost to you). Click here to learn more.
Would you like your name to appear with the review?
We will post your book review within a day or so as long as it meets our guidelines and terms and conditions. All reviews submitted become the licensed property of www.find-book.co.uk as written in our terms and conditions. None of your personal details will be passed on to any other third party.
All form fields are required.