GROUP-INVARIANT SOLUTIONS OF DIFFERENTIAL EQUATIONS.

Peter J. Olver; Philip Rosenau

doi:10.1137/0147018

GROUP-INVARIANT SOLUTIONS OF DIFFERENTIAL EQUATIONS.

Peter J. Olver, Philip Rosenau

Mathematics

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204 Scopus citations

Abstract

We introduce the concept of a weak symmetry group of a system of partial differential equations, that generalizes the 'nonclassical' method introduced by G. W. Bluman and J. D. Cole for finding group-invariant solutions to partial differential equations. Given any system of partial differential equations, it is shown how, in principle, to construct group-invariant solutions for any group of transformations by reducing the number of variables in the system. Conversely, every solution of the system can be found using this reduction method with some weak symmetry group.

Original language	English (US)
Pages (from-to)	263-278
Number of pages	16
Journal	SIAM Journal on Applied Mathematics
Volume	47
Issue number	2
DOIs	https://doi.org/10.1137/0147018
State	Published - 1987

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GROUP-INVARIANT SOLUTIONS OF DIFFERENTIAL EQUATIONS.

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