Multifractal Analysis of generalized Thue-Morse trigonometric polynomials

Abstract

We consider the generalized Thue-Morse sequences (tn(c))n 0 (c ∈ [0,1) being a parameter) defined by tn(c) = e2π i c s2(n), where s2(n) is the sum of digits of the binary expansion of n. For the polynomials σN(c) (x) := Σn=0N-1 tn(c) e2π i n x, we have proved in [18] that the uniform norm \|σN(c)\|∞ behaves like Nγ(c) and the best exponent γ(c) is computed. In this paper, we study the pointwise behavior and give a complete multifractal analysis of the limit n∞n-1 |σ2n(c)(x)|.

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