On the asymptotic behavior of Sudler products along subsequences

Abstract

Let α ∈ (0,1) and irrational. We investigate the asymptotic behaviour of sequences of certain trigonometric products (Sudler products) (PN(α))N∈N with PN(α) =Πr=1N|2(π r α)|. More precisely, we are interested in the asymptotic behaviour of subsequences of the form (Pqn(α)(α))n∈N, where qn(α) is the nth best approximation denominator of α. Interesting upper and lower bounds for the growth of these subsequences are given, and convergence results, obtained by Mestel and Verschueren (see arXiv:1411.2252math[DS]) and Grepstad and Neum\"uller (see arXiv:1801.09416[math.NT]), are generalized to the case of irrationals with bounded continued fraction coefficients.