Uniform estimates for the semi-periodic eigenvalues of the singular differential operators
Abstract
Let m∈ N, α∈[0,1], and V be a 1-periodic complex-valued distribution in the negative Sobolev space H-mα[0,1]. The singular non-self-adjoint eigenvalue problem D2mu+V u=λ u, D=-i d/dx, with semi-periodic boundary conditions is investigated. The uniform in V asymptotic and non-asymptotic eigenvalue estimates are found and proved. The case of periodic boundary conditions was studied by authors earlier.
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