Measure Upper Bounds for Nodal Sets of Eigenfunctions of the bi-Harmonic Operator

Abstract

In this article, we consider eigenfunctions u of the bi-harmonic operator, i.e., 2u=λ2u on with some homogeneous linear boundary conditions. We assume that ⊂eqRn (n≥2) is a C∞ bounded domain, ∂ is piecewise analytic and ∂ is analytic except a set ⊂eq∂ which is a finite union of some compact (n-2) dimensional submanifolds of ∂. The main result of this paper is that the measure upper bounds of the nodal sets of the eigenfunctions is controlled by λ. We first define a frequency function and a doubling index related to these eigenfunctions. With the help of establishing the monotonicity formula, doubling conditions and various a priori estimates, we obtain that the (n-1) dimensional Hausdorff measures of nodal sets of these eigenfunctions in a ball are controlled by the frequency function and λ. In order to further control the frequency function with λ, we first establish the relationship between the frequency function and the doubling index, and then separate the domain into two parts: a domain away from and a domain near , and develop iteration arguments to deal with the two cases respectively.