Average Nikolskii factors for random diffusion polynomials on closed Riemannian manifolds

Abstract

For 1 p,q ∞, the Nikolskii factor for a diffusion polynomial P a of degree at most n is defined by Np,q(P a)=\|P a\|q\|P a\|p,\ \ P a( x)=Σk:λk≤ nakφk( x), where a=\ak\λk n, and \(φk,-λk2)\k=0∞ are the eigenpairs of the Laplace-Beltrami operator M on a closed smooth Riemannian manifold M with normalized Riemannian measure. We study this average Nikolskii factor for random diffusion polynomials with independent N(0,σ2) coefficients and obtain the exact orders. For 1≤ p<q<∞, the average Nikolskii factor is of order n0 (i.e., constant), as compared to the worst case bound of order nd(1/p-1/q), and for 1≤ p<q=∞, the average Nikolskii factor is of order ( n)1/2 as compared to the worst case bound of order nd/p.