Reilly-type inequalities for submanifolds in Cartan-Hadamard manifolds

Abstract

Let M be an m (2)-dimensional closed orientable submanifold in an n-dimensional complete simply-connected Riemannian manifold N, where the sectional curvature of N is bounded above by δ. When δ<0, inspired by Niu-Xu (arXiv:2106.01912), we give new upper bounds for the first nonzero eigenvalues of the p-Laplacian and the LT operator, respectively. These generalize Niu-Xu's work for the Laplacian (arXiv:2106.01912) and improve the estimates due to Chen (Nonlinear Anal.,196, 111833, 2020) for the p-Laplacian and Grosjean (Hokkaido Math. J., 33(2) , 319-339, 2004) for the LT operator, respectively. We also obtain several Reilly-type inequalities for the weighted manifolds and some boundary value problems.