Sharp Estimates for the Principal Eigenvalue of the p-Operator

Abstract

Given an elliptic diffusion operator L defined on a compact and connected manifold (possibly with a convex boundary in a suitable sense) with an L-invariant measure m, we introduce the non-linear p-operator Lp, generalizing the notion of the p-Laplacian. Using techniques of the intrinsic 2-calculus, we prove the sharp estimate λ≥ (p-1)πpp/Dp for the principal eigenvalue of Lp with Neumann boundary conditions under the assumption that L satisfies the curvature-dimension condition BE(0,N) for some N∈[1,∞). Here, D denotes the intrinsic diameter of L. Equality holds if and only if L satisfies BE(0,1). We also derive the lower bound π2/D2+a/2 for the real part of the principal eigenvalue of a non-symmetric operator L=g+X·∇ satisfying BE(a,∞).