Critical sets of random smooth functions on compact manifolds

Abstract

Given a compact, m-dimensional Riemann manifold (M,g) and a large positive constant L we denote by UL the subspace of C∞(M) spanned by the eigenfunctions of the Laplacian corresponding to eigenvalues ≤ L. We equip UL with the standard Gaussian probability measure induced by the L2-metric on UL, and we denote by NL the expected number of critical points of a random function in UL. We prove that NL Cm UL as L→ ∞, where Cm is an explicit positive constant that depends only on the dimension m and satisfying the asymptotic estimate Cmm2 m as m ∞.