RE: PDEs & Mathematica.
- To: mathgroup@smc.vnet.net
- Subject: [mg10693] RE: [mg10642] PDEs & Mathematica.
- From: Jean-Marie THOMAS <jmthomas@cybercable.tm.fr>
- Date: Fri, 30 Jan 1998 04:24:30 -0500
- Return-Receipt-To: Jean-Marie THOMAS <jmthomas@cybercable.tm.fr>
Have a look at "Numerical Solutions for Partial Differential Equations, Problem Solving Using Mathematica", by Victor G. Ganzha and Evgenii V. Vorozhtsov. This book is described in WRI site: http://store.wolfram.com/view/ISBN0849373794/?347AE926-130E It is written for version 2 but I did not notice incompatibilities in version 3. However I must admit I did not use all the proposed programs, since the subject is quite wide. Hope this helps. -----Message d'origine----- De: William Golz [SMTP:wgolz@ibm.net] Date: mardi 27 janvier 1998 09:10 A: mathgroup@smc.vnet.net Objet: [mg10642] PDEs & Mathematica. The "online book" does not describe how to plug in initial and boundary conditions for a PDE; and when I try to do it ODE style, which is explained I get error messages. If anyone knows the proper syntax for solving PDEs with boundary conditions, I would appreciate some advice. I would also appreciate any information on good books dealing with PDEs and Mathematica. ____________ William Golz Department of Civil & Environmental Engineering Louisiana State University Baton Rouge, Louisiana 70803 E-mail: wgolz@unix1.sncc.lsu.edu Phone: (318)237-8353