On the essential spectrum of the Laplacian and the drifted Laplacian

Abstract

This paper concerns the L2 essential spectrum of the Laplacian and the drift Laplacian f on complete Riemannian manifolds endowed with a weighted measure e-fd\;volg. We prove that the essential spectrum of the drift Laplacian f is [0,+∞) provided the Bakry-\'Emery curvature tensor Ricf is nonnegative and f has sublinear growth . When Ricf ≥ 1/2 g and |∇ f|2 ≤ f, we show that the essential spectrum of the Laplacian is also [0,+∞). During the proofs of these results, the f-volume growth estimate plays an important role and may be of independent interest.