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| Name: | ||
| Miloslav Znojil | ||
| Reviewer number: | ||
| 9689 | ||
| Email: | ||
| znojil@ujf.cas.cz | ||
| Item's zbl-Number: | ||
| DE 018 728 86X | ||
| Author(s): | ||
| Behncke, Horst: | ||
| Shorttitle: | ||
| The spectrum of differential operators with almost constant coefficients | ||
| Source: | ||
| J. Comput. Appl. Math. 148, No. 1, 287-305 (2002) | ||
| Classification: | ||
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| Review: | ||
The practical importance of Schroedinger equation on half-axis is one of the key roots of the author's interest in the determination of the absolutely continuous spectrum of the more general operators H related to the linear and formaly symmetric differential expressions L of the order 2n. Under standard assumptions on the smoothness and asymptotic decay of coefficients it is proved and illustrated that for any self-adjoint extension H of L, its absolutely continuous part is unitarily equivalent to the operator of multiplication derived from the asymptotics of coefficients. The method of asymptotic integration (in a way continuing the previous work [5] and inspired by a twenty years old work [1] by Ahlbrandt et al) is used. Imagining that the associated first-order system is Hamiltonian, it is shown most natural to employ the generalized (= matrix) form of the Titchmarsh-Weyl concept of the m-function (cf. [12]). Its interpretation as a Borel transform of the spectral measure leads to the desired results via a repeated Kummer-Liouville transformations (= ``diagonalizations") modulo ``Levinson" terms (having no influence on asymptotics). | ||
| Remarks to the editors: | ||