Curvature effect in the spinorial Yamabe problem on product manifolds

Abstract

Let (M1,g(1)), (M2,g(2)) be closed Riemannian spin manifolds. We study the existence of solutions of the spinorial Yamabe problem on the product M1× M2 equipped with a family of metrics -2g(1)(2), >0. Via variational methods and blow-up techniques, we prove the existence of solutions which depend only on the factor M1, and which exhibit a spike layer as 0. Moreover, we locate the asymptotic position of the peak points of the solutions in terms of the curvature tensor on (M1,g(1)).