A group theoretic proof of a compactness lemma and existence of nonradial solutions for semilinear elliptic equations

Abstract

Symmetry plays a basic role in variational problems (settled e.g. in Rn or in a more general manifold), for example to deal with the lack of compactness which naturally appear when the problem is invariant under the action of a noncompact group. In Rn, a compactness result for invariant functions with respect to a subgroup G of O(n) has been proved under the condition that the G action on Rn is compatible, see willem. As a first result we generalize this and show here that the compactness is recovered for particular subgroups of the isometry group of a Riemannian manifold. We investigate also isometric action on Hadamard manifold (M,g) proving that a large class of subgroups of Iso(M,g) is compatible. As an application we get a compactness result for ``invariant'' functions which allows us to prove the existence of nonradial solutions for a classical scalar equation and for a nonlocal fractional equation on Rn for n=3 and n=5, improving some results known in the literature. Finally, we prove the existence of nonradial invariant functions such that a compactness result holds for some symmetric spaces of non compact type.