The 1/2--Complex Bruno function and the Yoccoz function. A numerical study of the Marmi--Moussa--Yoccoz Conjecture

Abstract

We study the 1/2--Complex Bruno function and we produce an algorithm to evaluate it numerically, giving a characterization of the monoid M=MT MS. We use this algorithm to test the Marmi--Moussa--Yoccoz Conjecture about the H\"older continuity of the function z -iB(z)+ U(e2π i z) on \z∈ C: z ≥ 0 \, where B is the 1/2--complex Bruno function and U is the Yoccoz function. We give a positive answer to an explicit question of S. Marmi et al [MMY2001].

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