Density of zero sets for sums of eigenfunctions
Abstract
We consider linear combinations of eigenfunctions of the Laplace-Beltrami operator on a compact Riemannian manifold (M,g) and investigate a density property of their zero sets. More precisely, let f=Σk=1m ak φλjk, where -gφλ=λφλ. Denoting by Zf the zero-set of f, we show that for any x∈ M, dist(x,Zf)≤ C(m)λj1-1/2. The proof is based on a new integral Harnack-type estimate for positive solutions of higher order elliptic PDEs.
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