Analytic proofs of Andrews-Bachraoui identities related to two-color partitions with evens in one color
Abstract
Andrews and Bachraoui (Int. J. Number Theory (2026)) studied the two-color partition function F(n) of a non-negative integer n wherein odd parts may appear in two colors (red and blue) and even parts appear in one color (blue). For any non-negative integer n, they also considered some restricted versions of F(n): F0(n): the number of partitions of n counted by F(n) such that the number of odd parts in red color is even; F1(n): the number of partitions counted by F(n) such that the number of odd parts in red color is odd; H(n): the number of partitions of n counted by F(n) such that the parts of the same color do not repeat. The main purpose of this paper is to present the analytic proofs of the q-series identities connected with F(n) and H(n), which appeared as open problems in the original paper. We also prove some congruences of F0(n) and F1(n) modulo 2, 4, and 8 by using q -series.
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