Evolution of the first eigenvalue of weighted p-Laplacian along the Ricci-Bourguignon flow

Abstract

Let M be an n-dimensional closed Riemannian manifold with metric g, dμ=e-φ(x)d be the weighted measure and p,φ be the weighted p-Laplacian. In this article we will investigate monotonicity for the first eigenvalue problem of the weighted p-Laplace operator acting on the space of functions along the Ricci-Bourguignon flow on closed Riemannian manifolds. We find the first variation formula for the eigenvalues of the weighted p-Laplacian on a closed Riemannian manifold evolving by the Ricci-Bourguignon flow and we obtain various monotonic quantities. At the end we find some applications in 2-dimensional and 3-dimensional manifolds and give an example.