Integral estimates for the trace of symmetric operators

Abstract

Let :TM TM be a positive-semidefinite symmetric operator of class C1 defined on a complete non-compact manifold M isometrically immersed in a Hadamard space M. In this paper, we given conditions on the operator and on the second fundamental form to guarantee that either 0 or the integral ∫M tr\, dM is infinite. We will given some applications. The first one says that if M admits an integrable distribution whose integrals are minimal submanifolds in M then the volume of M must be infinite. Another application states that if the sectional curvature of M satisfies K≤ -c2, for some c≥ 0, and λ:Mm [0,∞) is a nonnegative C1 function such that gradient vector of λ and the mean curvature vector H of the immersion satisfy |H+p∇ λ|≤ (m-1)c λ, for some p≥ 1, then either λ 0 or the integral ∫M λs dM is infinite, for all 1≤ s≤ p.