Residue Restrictions for a Two-Color Partition Series

Abstract

We study residue restrictions for a two-color partition series P(q)=(q4;q4)∞ S(q) arising from work of Andrews and Bachraoui on partitions with odd smallest part. Motivated by the explicit exponent structure in the Bailey-transform formulas for the associated generating function, we obtain elementary restrictions on the support of the coefficients. In particular, we show that the residue class 48 does not occur, and we prove a further refinement modulo 16, yielding several vanishing classes for the coefficients of the series. Our argument is completely residue-theoretic and avoids the use of modular completions.