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Paper detail

Johnson-Schwartzman Gap Labelling for Ergodic Jacobi Matrices

We consider two-sided Jacobi matrices whose coefficients are obtained by continuous sampling along the orbits of a homeomorphim of a compact metric space. Given an ergodic probability measure, we study the topological structure of the associated almost sure spectrum. We establish a gap labelling theorem in the spirit of Johnson and Schwartzman. That is, we show that the constant value the integrated density of states takes in a gap of the spectrum must belong to the countable Schwartzman group of the base dynamics. This result is a natural companion to a recent result of Alkorn and Zhang, which established a Johnson-type theorem for the families of Jacobi matrices in question.

preprint2022arXivOpen access
David DamanikJake FillmanZhenghe Zhang
math-phmath.DSmath.MPmath.SP
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David DamanikJake FillmanZhenghe Zhang

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