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On the absence of absolutely continuous spectra for Schrödinger operators on radial tree graphs

Pavel ExnerCzech Technical University 1 Doppler Institute for Mathematical Physics and Applied Mathematics, , Břehová 7, 11519 Prague, Czech RepublicJiř̌í LipovskýCharles University 3 Institute of Theoretical Physics, Faculty of Mathematics and Physics, , V Holešovičkách 2, 18000 Prague, Czech Republic
2010en
ABI

Аннотация

The subject of the paper is Schrödinger operators on tree graphs which are radial, having the branching number \documentclass[12pt]{minimal}\begin{document}$b_n$\end{document}bn at all the vertices at the distance \documentclass[12pt]{minimal}\begin{document}$t_n$\end{document}tn from the root. We consider a family of coupling conditions at the vertices characterized by \documentclass[12pt]{minimal}\begin{document}$(b_n-1)^2+4$\end{document}(bn−1)2+4 real parameters. We prove that if the graph is sparse so that there is a subsequence of \documentclass[12pt]{minimal}\begin{document}$\lbrace t_{n+1}-t_n\rbrace$\end{document}{tn+1−tn} growing to infinity, in the absence of the potential the absolutely continuous spectrum is empty for a large subset of these vertex couplings, but on the the other hand, there are cases when the spectrum of such a Schrödinger operator can be purely absolutely continuous.

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