Average Lq growth and nodal sets of eigenfunctions of the Laplacian on surfaces

Abstract

In a recent paper, we exhibit a link between the average local growth of Laplace eigenfunctions on surfaces and the size of their nodal set. In that paper, the average local growth is computed using the uniform - or L∞ - growth exponents on disks of wavelength radius. The purpose of this note is to prove similar results for a broader class of Lq growth exponents with q ∈ (1, ∞). More precisely, we show that the size of the nodal set is bounded above and below by the product of the average local Lq growth with the frequency. We briefly discuss the relation between this new result and Yau's conjecture on the size of nodal sets.