Hot spots on cones and warped product manifolds

Abstract

We study extrema of solutions to the heat equation (i.e. hot spots) on a class of warped product manifolds of the form ([0,L]× M,dr2+f(r)2h) where (M,h) is a closed Riemannian manifold. We prove that, under certain conditions on the warping function f, the statement of Rauch's hot spots conjecture holds for the corresponding warped product. We then go on to study the long-time behavior of hot spots on infinite cones over closed Riemannian manifolds. In this case, under appropriate hypotheses on the initial condition, there are four possible long-time behaviors depending only on the spectral gap of the fiber (M,h).