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$L^infty$-estimation of generalized Thue-Morse trigonometric polynomials and ergodic maximization

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 Added by Aihua Fan
 Publication date 2019
  fields
and research's language is English




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Given an integer $qge 2$ and a real number $cin [0,1)$, consider the generalized Thue-Morse sequence $(t_n^{(q;c)})_{nge 0}$ defined by $t_n^{(q;c)} = e^{2pi i c S_q(n)}$, where $S_q(n)$ is the sum of digits of the $q$-expansion of $n$. We prove that the $L^infty$-norm of the trigonometric polynomials $sigma_{N}^{(q;c)} (x) := sum_{n=0}^{N-1} t_n^{(q;c)} e^{2pi i n x}$, behaves like $N^{gamma(q;c)}$, where $gamma(q;c)$ is equal to the dynamical maximal value of $log_q left|frac{sin qpi (x+c)}{sin pi (x+c)}right|$ relative to the dynamics $x mapsto qx mod 1$ and that the maximum value is attained by a $q$-Sturmian measure. Numerical values of $gamma(q;c)$ can be computed.



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49 - Michael Baake 2018
The classic Thue--Morse measure is a paradigmatic example of a purely singular continuous probability measure on the unit interval. Since it has a representation as an infinite Riesz product, many aspects of this measure have been studied in the past, including various scaling properties and a partly heuristic multifractal analysis. Some of the difficulties emerge from the appearance of an unbounded potential in the thermodynamic formalism. It is the purpose of this article to review and prove some of the observations that were previously established via numerical or scaling arguments.
261 - Yiwei Zhang , Ke Yin , Wanquan Wu 2018
In this paper, we will provide a mathematically rigorous computer aided estimation for the exact values and robustness for Gelfond exponent of weighted Thue-Morse sequences. This result improves previous discussions on Gelfond exponent by Gelfond, Devenport, Mauduit, Rivat, S{a}rk{o}zy and Fan et. al.
93 - Michael Baake 2013
We revisit the well-known and much studied Riesz product representation of the Thue-Morse diffraction measure, which is also the maximal spectral measure for the corresponding dynamical spectrum in the complement of the pure point part. The known scaling relations are summarised, and some new findings are explained.
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136 - Yann Bugeaud , Guo-Niu Han 2021
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