Arithmetic properties of coefficients of power series expansion of Πn=0∞(1-x2n)t (with an Appendix by Andrzej Schinzel)

Abstract

Let F(x)=Πn=0∞(1-x2n) be the generating function for the Prouhet-Thue-Morse sequence ((-1)s2(n))n∈. In this paper we initiate the study of the arithmetic properties of coefficients of the power series expansions of the function Ft(x)=F(x)t=Σn=0∞fn(t)xn. For t∈+ the sequence (fn(t))n∈ is the Cauchy convolution of t copies of the Prouhet-Thue-Morse sequence. For t∈<0 the n-th term of the sequence (fn(t))n∈ counts the number of representations of the number n as a sum of powers of 2 where each summand can have one among -t colors. Among other things, we present a characterization of the solutions of the equations fn(2k)=0, where k∈, and fn(3)=0. Next, we present the exact value of the 2-adic valuation of the number fn(1-2m) - a result which generalizes the well known expression concerning the 2-adic valuation of the values of the binary partition function introduced by Euler and studied by Churchhouse and others.