A new estimate for the spectral function of the self-adjoint extension in \(L^{2}(\mathbb R)\) of the Sturm-Liouville operator with a uniformly locally integrable potential
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Publication:2461861
DOI10.1134/S0012266106020078zbMath1139.34061MaRDI QIDQ2461861
Publication date: 21 November 2007
Published in: Differential Equations (Search for Journal in Brave)
Particular ordinary differential operators (Dirac, one-dimensional Schrödinger, etc.) (34L40) General theory of ordinary differential operators (47E05) Boundary value problems on infinite intervals for ordinary differential equations (34B40)
Related Items (6)
Uniform, on the entire axis, convergence of the spectral expansion for Schrödinger operator with a potential-distribution ⋮ Uniform convergence of spectral expansions on the entire real line for general even-order differential operators ⋮ Momentum operators in two intervals: spectra and phase transition ⋮ Restrictions and extensions of semibounded operators ⋮ On the equiconvergence rate with the Fourier integral of the spectral expansion associated with the self-adjoint extension of the Sturm-Liouville operator with uniformly locally integrable potential ⋮ Spectral theory of multiple intervals
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