Local spectral estimates and quantitative weak mixing for substitution Z ${\mathbb {Z}}$ -actions

The paper investigates Hölder and log-Hölder regularity of spectral measures for weakly mixing substitutions and the related question of quantitative weak mixing. It is assumed that the substitution is primitive, aperiodic, and its substitution matrix is irreducible over the rationals. In the case when there are no eigenvalues of the substitution matrix on the unit circle, Theorem 2.2 says that a weakly mixing substitution $Z$-action has uniformly log-Hölder regular spectral measures, and hence admits power-logarithmic bounds for the rate of weak mixing. In the more delicate Salem substitution case, Theorem 2.5 says that Hölder regularity holds for spectral parameters from the respective number field, but the Hölder exponent cannot be chosen uniformly.