ODEs, PDE solutions: when are they "general"? - Maple Application Center
Application Center Applications ODEs, PDE solutions: when are they "general"?

ODEs, PDE solutions: when are they "general"?

: Maplesoft AuthorDr. Edgardo Cheb-Terrab
Engineering software solutions from Maplesoft
This Application runs in Maple. Don't have Maple? No problem!
 Try Maple free for 15 days!
This presentation discusses the concept of “general solution” of a Partial Differential Equation, or a system of them, possibly including ODEs and/or algebraic equations, and shows how to tell whether a solution returned by Maple’s pdsolve is or not a general (as opposed to particular) solution.

This application is also the subject of a blog post on MaplePrimes.

Application Details

Publish Date: September 30, 2016
Created In: Maple 2016
Language: English

More Like This

Quantum Mechanics: Schrödinger vs Heisenberg picture
The Landau criterion for Superfluidity
The Gross-Pitaevskii equation and Bogoliubov spectrum
Ground state of a quantum system of identical boson particles
Computer Algebra in Theoretical Physics (IOP Webinar)
Mini-Course: Computer Algebra for Physicists
Equivalence problem in General Relativity
Exact solutions to Einstein's equations
General Relativity using Computer Algebra
Tetrads and Weyl scalars in canonical form
ODEs, PDEs and Special Functions