The Sharp Measure Upper Bound of the Nodal Sets of Neumann Laplace Eigenfunctions on C1,1 Domains

Abstract

Let be a bounded domain in Rn with C1,1 boundary and let uλ be a Neumann Laplace eigenfunction in with eigenvalue λ. We show that the (n - 1)-dimensional Hausdorff measure of the zero set of uλ does not exceed Cλ.

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