Nodal sets and continuity of eigenfunctions of Krein-Feller operators on Riemannian manifolds
Abstract
Let d≥1, be a bounded domain of a smooth complete Riemannian d-manifold M, and μ be a positive finite Borel measure with compact support in . We prove the Courant nodal domain theorem for the eigenfunctions of Krein-Feller operator μ under the assumption that such eigenfunctions are continuous on . For d≥2, We prove that on a bounded domain ⊂ M with smooth boundary and on which the Green's function of the Laplace-Beltrami operator exists, the eigenfunctions of μ are continuous on . We also prove that if M is compact and ∂ M=, then the eigenfuctions of μ are continuous on M.
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