On K-peak solutions for the Yamabe equation on product manifolds

Abstract

Let (Mn, g) and (Xm, h) be closed manifolds m, n>2, such that (X, h) has constant positive scalar curvature. We consider the one parameter family of products (M× X, g+ε2 h), ε>0. We prove that if either the scalar curvature of g, sg, is constant or a certain dimensional constant β=0, there is some function :M→ R that depends on sg, the norm of the Ricci curvature of g and the norm of the curvature tensor of g; such that if 0 is a stable, isolated, critical point of , then for each K∈N, there is some ε0>0 such that for every ε ∈ (0,ε0) the subcritical Yamabe equation -ε2g u+(1+cε2 sg)u=uq has a positive K-peak solution, which concentrates around 0. Here, c=N-24(N-1), q=N+2N-2 and N=n+m. This provides solutions for the Yamabe equation on Riemannian products (M× X, g+ε2 h) and covers some remaining cases of previous results which handle the case where sg has non-degenerate critical points and β≠0.

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