Monotonicity of eigenvalues of geometric operaters along the Ricci-Bourguignon flow

Abstract

In this paper, we study monotonicity of eigenvalues of Laplacian-type operator -+cR, where c is a constant, along the Ricci-Bourguignon flow. For c≠0, We derive monotonicity of the lowest eigenvalue of Laplacian-type operator -+cR which generalizes some results of Cao Cao2007. For c=0, We derive monotonicity of the first eigenvalue of Laplacian which generalizes some results of Ma Ma2006. Moreover, we prove that when (M3, g0) is a closed three manifold with positive Ricci curvature, the eigenvalue of the Laplacian diverges as t → T on a limited maximal time in terval [0, T), which generalizes some results of Cerbo and Fabrizio Fabrizio2007.