Upper Measure Bounds of Nodal Sets of Solutions to the Bi-Harmonic Equations on C∞ Riemannian Manifolds

Abstract

In this paper, we consider the nodal set of a bi-harmonic function u on an n dimensional C∞ Riemannian manifold M, that is, u satisfies the equation M2u=0 on M, where M is the Laplacian operator on M. We first define the frequency function and the doubling index for the bi-harmonic function u, and then establish their monotonicity formulae and doubling conditions. With the help of the smallness propagation and partitions, we show that, for some ball Br(x0)⊂eq M with r small enough, an upper bound for the measure of nodal set of the bi-harmonic function u can be controlled by Nα, that is, Hn-1(\x∈ Br/2(x0)|u(x)=0\)≤ CNαrn-1, where N=\C0,N(x0,r)\, α, C and C0 both are positive constants depending only on n and M. Here N(x0,r) is the frequency function of u centered at x0 with radius r. Furthermore, we derive that an upper measure for nodal sets of eigenfunctions of the bi-harmonic operator on a C∞ compact Riemannian manifold without boundary can be controlled by λβ for the corresponding eigenvalue λ2 and some positive constant β.