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Paper detail

High-Energy analysis and Levinson's theorem for the selfadjoint matrix Schroedinger operator on the half line

The matrix Schroedinger equation with a selfadjoint matrix potential is considered on the half line with the general selfadjoint boundary condition at the origin. When the matrix potential is integrable, the high-energy asymptotics are established for the related Jost matrix, the inverse of the Jost matrix, and the scattering matrix. Under the additional assumption that the matrix potential has a first moment, Levinson's theorem is derived, relating the number of bound states to the change in the argument of the determinant of the scattering matrix.

preprint2014arXivOpen access
Tuncay AktosunRicardo Weder
math-phmath.MP
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Tuncay AktosunRicardo Weder

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