Estimates for eigenvalues of Lr operator on self-shrinkers

Abstract

Let x: M→ RN be an n-dimensional compact self-shrinker in RN with smooth boundary ∂. In this paper, we study eigenvalues of the operator Lr on M, where Lr is defined by Lr=e|x|22 div(e-|x|22Tr∇·) with Tr denoting a positive definite (0,2)-tensor field on M. We obtain "universal" inequalities for eigenvalues of the operator Lr. These inequalities generalize the result of Cheng and Peng in ChengPeng2013. Furthermore, we also consider the case that equalities occur.