On the principal eigenvalue of the truncated Laplacian, and submanifolds with bounded mean curvature

Abstract

In this paper, we study the principal eigenvalue μ(Fk-,E) of the fully nonlinear operator \[ Fk-[u] = Pk-(∇2 u) - h |∇ u| \] on a set E Rn, where h ∈ [0,∞) and Pk-(∇2 u) is the sum of the smallest k eigenvalues of the Hessian ∇2 u. We prove a lower estimate for μ(Fk-,E) in terms of a generalized Hausdorff measure H(E), for suitable depending on k, moving some steps in the direction of the conjecturally sharp estimate \[ μ(Fk-,E) C Hk(E)-2/k. \] The theorem is used to study the spectrum of bounded submanifolds in Rn, improving on our previous work in the direction of a question posed by S.T. Yau. In particular, the result applies to solutions of Plateau's problem for CMC surfaces.