Some results on vanishing coefficients in infinite product expansions

Abstract

Recently, M. D. Hirschhorn proved that, if Σn=0∞ anqn := (-q,-q4;q5)∞(q,q9;q10)∞3 and Σn=0∞ bnqn:=(-q2,-q3;q5)∞(q3,q7;q10)∞3, then a5n+2=a5n+4=0 and b5n+1=b5n+4=0. Motivated by the work of Hirschhorn, D. Tang proved some comparable results including the following: If Σn=0∞ cnqn := (-q,-q4;q5)∞3(q3,q7;q10)∞ and Σn=0∞ dnqn := (-q2,-q3;q5)∞3(q,q9;q10)∞, then c5n+3=c5n+4=0 and d5n+3=d5n+4=0. In this paper, we prove that a5n=b5n+2, a5n+1=b5n+3, a5n+2=b5n+4, a5n-1=b5n+1, c5n+3=d5n+3, c5n+4=d5n+4, c5n=d5n, c5n+2=d5n+2, and c5n+1>d5n+1. We also record some other comparable results not listed by Tang.