Exact Lp growth rates of Laplace eigenfunctions on the unit disk

Abstract

We determine the logarithmic growth exponents of the Lp norms, 1 p∞, of L2-normalized Laplace eigenfunctions on the unit disk, for both Dirichlet and Neumann boundary conditions. We also prove sharp uniform Lp upper and lower bounds for every L2-normalized Dirichlet eigenfunction and every non-constant Neumann eigenfunction uλ on the disk. The proof uses stationary phase estimates and integral estimates for Bessel functions.