A proof of Andrews-El Bachraoui's conjecture on the parity of coefficients of a q-series

Abstract

Recently, Andrews and El Bachraoui studied a partition function s1(n) which counts the number of two-color partitions into distinct parts of n whose smallest part occurs in one prescribed color only, while every larger part may occur in either color or in both colors. They obtained a complete description modulo 4 for s1(n). They also considered a q-series To(q) which is the odd companion series of the generating function for s1(n). At the end of their paper, they presented a conjecture on the parity of the coefficients of To(q). In this paper, we confirm this conjecture. Moreover,we establish an infinite family of congruences modulo 8 for the coefficients of S1(q) and prove that s1(n)/8 takes integer values with natural density 1 for n≥ 0.

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