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Invariants, equivariants and characters in symmetric bifurcation theory

Published online by Cambridge University Press:  14 July 2008

Fernando Antoneli
Affiliation:
Centro de Matemática, Departamento de Matemática Pura, Universidade do Porto, Porto 4169-007, Portugal ([email protected]; [email protected])
Ana Paula S. Dias
Affiliation:
Centro de Matemática, Departamento de Matemática Pura, Universidade do Porto, Porto 4169-007, Portugal ([email protected]; [email protected])
Paul C. Matthews
Affiliation:
School of Mathematical Sciences, University of Nottingham, Nottingham NG7 2RD, UK ([email protected])

Abstract

In the analysis of stability in bifurcation problems it is often assumed that the (appropriate reduced) equations are in normal form. In the presence of symmetry, the truncated normal form is an equivariant polynomial map. Therefore, the determination of invariants and equivariants of the group of symmetries of the problem is an important step. In general, these are hard problems of invariant theory and, in most cases, they are tractable only through symbolic computer programs. Nevertheless, it is desirable to obtain some of the information about invariants and equivariants without actually computing them, for example, the number of linearly independent homogeneous invariants or equivariants of a certain degree. Generating functions for these dimensions are generally known as ‘Molien functions'.

We obtain formulae for the number of linearly independent homogeneous invariants or equivariants for Hopf bifurcation in terms of characters. We also show how to construct Molien functions for invariants and equivariants for Hopf bifurcation. Our results are then applied to the computation of the number of invariants and equivariants for Hopf bifurcation for several finite groups and the continuous group $\mathbb{O}(3)$.

Type
Research Article
Copyright
2008 Royal Society of Edinburgh

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