Talk
Symmetry-breaking bifurcations
- Joel Smoller (University of Michigan, Ann Arbor, USA)
Abstract
We present a theory of bifurcation from symmetry, based on topological techniques (Conley Index) and group representations. We apply the theory to equations of the form: Laplacian(u)+f(u)=0, on balls in $R^n$ with general homogenous boundary conditions, and we prove the existence of asymmetric (non-radial) solutions.