Some results on vanishing coefficients in infinite product expansions (1908.07737v1)
Abstract: Recently, M. D. Hirschhorn proved that, if $\sum_{n=0}\infty a_nqn := (-q,-q4;q5)\infty(q,q9;q{10})\infty3$ and $\sum_{n=0}\infty b_nqn:=(-q2,-q3;q5)\infty(q3,q7;q{10})\infty3$, then $a_{5n+2}=a_{5n+4}=0$ and $b_{5n+1}=b_{5n+4}=0$. Motivated by the work of Hirschhorn, D. Tang proved some comparable results including the following: If $ \sum_{n=0}\infty c_nqn := (-q,-q4;q5)\infty3(q3,q7;q{10})\infty$ and $\sum_{n=0}\infty d_nqn := (-q2,-q3;q5)\infty3(q,q9;q{10})\infty$, then $c_{5n+3}=c_{5n+4}=0$ and $d_{5n+3}=d_{5n+4}=0$. In this paper, we prove that $a_{5n}=b_{5n+2}$, $a_{5n+1}=b_{5n+3}$, $a_{5n+2}=b_{5n+4}$, $a_{5n-1}=b_{5n+1}$, $c_{5n+3}=d_{5n+3}$, $c_{5n+4}=d_{5n+4}$, $c_{5n}=d_{5n}$, $c_{5n+2}=d_{5n+2}$, and $c_{5n+1}>d_{5n+1}$. We also record some other comparable results not listed by Tang.