Second Yamabe Constant on Riemannian Products

Abstract

Let (Mm,g) be a closed Riemannian manifold (m≥ 2) of positive scalar curvature and (Nn,h) any closed manifold. We study the asymptotic behaviour of the second Yamabe constant and the second N-Yamabe constant of (M× N,g+th) as t goes to +∞. We obtain that t +∞Y2(M× N,[g+th])=22m+nY(M× n, [g+ge]). If n≥ 2, we show the existence of nodal solutions of the Yamabe equation on (M× N,g+th) (provided t large enough). When the scalar curvature of (M,g) is constant, we prove that t +∞Y2N(M× N,g+th)=22m+nYn(M× n, g+ge). Also we study the second Yamabe invariant and the second N-Yamabe invariant.