A note on sign-changing solutions to supercritical Yamabe-type equations

Abstract

On a closed Riemannian manifold (Mn ,g), we consider the Yamabe-type equation -g u + λ u = λ |u|q-1u, where λ ∈ R+ and q>1. We assume that M admits a proper isoparametric function f with focal submanifolds of positive dimension. If k>0 is the minimum of the dimensions of the focal submanifolds of f, we let q* =n-k+2n-k-2. We prove the existence of infinite f-invariant sign-changing solutions to the equation when 1<q<q*.