Nodal sets and continuity of eigenfunctions of Kre-Feller operators
Abstract
Let μ be a compactly supported positive finite Borel measure on d. Let 0<λ1≤λ2≤… be eigenvalues of the Kren-Feller operator μ. We prove that, on a bounded domain, the nodal set of a continuous λn-eigenfunction of a Kren-Feller operator divides the domain into at least 2 and at most n+r-1 subdomains, where r is the multiplicity of λn. This work generalizes the nodal set theorem of the classical Laplace operator to Kren-Feller operators on bounded domains. We also prove that on bounded domains on which the classical Green function exists, the eigenfunctions of a Kren-Feller operator are continuous.
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