Nodal sets of Laplace eigenfunctions: estimates of the Hausdorff measure in dimension two and three

Abstract

Let M be the Laplace operator on a compact n-dimensional Riemannian manifold without boundary. We study the zero sets of its eigenfunctions u: u + λ u =0. In dimension n=2 we refine the Donnelly-Fefferman estimate by showing that H1(\u=0 \) Cλ3/4-β, β ∈ (0,1/4). The proof employs the Donnelli-Fefferman estimate and a combinatorial argument, which also gives a lower (non-sharp) bound in dimension n=3: H2(\u=0\) cλα, α ∈ (0,1/2). The positive constants c,C depend on the manifold, α and β are universal.