On Simon's Hausdorff Dimension Conjecture

David Damanik (Rice University); Jake Fillman (Texas State; University); Shuzheng Guo (Ocean University of China; Rice University),; Darren C. Ong (Xiamen University Malaysia)

arXiv:2012.00660·math.SP·December 2, 2020

On Simon's Hausdorff Dimension Conjecture

David Damanik (Rice University), Jake Fillman (Texas State, University), Shuzheng Guo (Ocean University of China, Rice University),, Darren C. Ong (Xiamen University Malaysia)

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Abstract

Barry Simon conjectured in 2005 that the Szeg\H{o} matrices, associated with Verblunsky coefficients ${α_{n}}_{n \in Z_{+}}$ obeying $\sum_{n = 0}^{\infty} n^{γ} ∣ α_{n} ∣^{2} < \infty$ for some $γ \in (0, 1)$ , are bounded for values $z \in \partial D$ outside a set of Hausdorff dimension no more than $1 - γ$ . Three of the authors recently proved this conjecture by employing a Pr\"ufer variable approach that is analogous to work Christian Remling did on Schr\"odinger operators. This paper is a companion piece that presents a simple proof of a weak version of Simon's conjecture that is in the spirit of a proof of a different conjecture of Simon.

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TopicsMathematical Analysis and Transform Methods · Spectral Theory in Mathematical Physics · Mathematical functions and polynomials