On spectral asymptotics of the Neumann problem for the Sturm-Liouville equation with self-similar generalized Cantor type weight

Abstract

Spectral asymptotics of the Neumann problem for the Sturm-Liouville equation with generalized derivative of a self-similar generalized Cantor type function as a weight are considered. The spectrum is shown to have a periodicity property for a wide class of Cantor type self-similar functions, and also the weaker "quasi-periodicity" condition is demonstrated under certain mixed boundary conditions. This allows for a more precise description of the main term of the asymptotics of the counting function of eigenvalues. Previous results by A. A. Vladimirov, I. A. Sheipak are generalized.