Reduction of exterior differential systems with infinite dimensional symmetry groups

Autor:	Juha Pohjanpelto
Rok vydání:	2008
Předmět:	Pure mathematics Computer Networks and Communications Differential equation Applied Mathematics Numerical analysis Mathematical analysis Symmetry group Invariant (physics) Differential systems Computational Mathematics Moving frame Differential invariant Pseudogroup Software Mathematics
Zdroj:	BIT Numerical Mathematics. 48:337-355
ISSN:	1572-9125 0006-3835
DOI:	10.1007/s10543-008-0177-9
Popis:	A symmetry-based method for constructing solutions to systems of differential equations founded on the reduction of exterior differential systems invariant under the action of an infinite dimensional pseudogroup is proposed. One can associate to any system of differential equations Δ=0 with a symmetry group \(\mathcal{G}\) an exterior differential system \(\mathcal{I}\) invariant under \(\mathcal{G}\) so that solutions of Δ=0 correspond to integral manifolds \(\mathcal{I}\). The \(\mathcal{G}\)-invariant exterior differential system gives rise to a reduced system \(\overline{\mathcal{I}}\) specified on a cross section to the pseudogroup orbits, and it is shown that solutions to Δ=0 can be reconstructed from integral manifolds \(\overline{\mathcal{I}}\) by solving an equation of generalized Lie type for the jets of pseudogroup transformations. In particular, as opposed to the classical method of symmetry reduction, every solution to the system of differential equations can, under some mild regularity assumptions, be constructed by the present algorithm.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::e13386b91716ef0605e3d1dd031d78be https://doi.org/10.1007/s10543-008-0177-9 Zobrazit plný text záznamu Full text from SpringerLink