Home | Quick Search | Advanced Search | Bibliography submission | Bibliography submission using bibtex | Bibliography submission using bibtex file | Links | Help | Internal

Details:

   
TitleSymbolic analysis for boundary problems: from rewriting to parametrized Gr\"obner bases.
Author(s) Bruno Buchberger, Georg Regensburger, Markus Rosenkranz, Loredana Tec
TypeBook, Chapter in Book, Conference Proceeding
AbstractWe review our algebraic framework for linear boundary problems (concentrating on ordinary differential equations). Its starting point is an appropriate algebraization of the domain of functions, which we have named integro-differential algebras. The algebraic treatment of boundary problems brings up two new algebraic structures whose symbolic representation and computational realization is based on canonical forms in certain commutative and noncommutative polynomial domains. The first of these, the ring of integro-differential operators, is used for both stating and solving linear boundary problems. The other structure, called integro-differential polynomials, is the key tool for describing extensions of integro-differential algebras. We use the canonical simplifier for integro-differential polynomials for generating an automated proof establishing a canonical simplifier for integro-differential operators. Our approach is fully implemented in the Theorema system; some code fragments and sample computations are included.
ISBN978-3-7091-0793-5/pbk; 978-3-7
URL http://link.springer.com/chapter/10.1007%2F978-3-7091-0794-2_13
LanguageEnglish
Pages273--331
PublisherNew York, NY: Springer
Year2012
Edition0
Translation No
Refereed No
Webmaster