Some New Congruences Modulo Powers of 2 For $(j,k)$-Regular Overpartition (2109.07209v1)

Abstract: Let $\overline{p}{j,k}(n)$ denotes the number of $(j,k)$-regular overpartitions of a positive integer $n$ such that none of the parts is congruent to $j$ modulo $k$. Naika et. al. (2021) proved infinite families of congruences modulo powers of 2 for $\overline{p}{3,6}(n)$, $\overline{p}{5,10}(n)$ and $\overline{p}{9,18}(n)$. In this paper, we obtain infinite families of congruences modulo power of 2 for $\overline{p}{4,8}(n)$, $\overline{p}{6,12}(n)$ and $\overline{p}{8,16}(n)$. For example, we prove that, for all integers $n\geq 0$ and $\alpha\geq 0$, $$ \overline{p}{4,8}\left( 5^{2\alpha+1}\left( 16(5n+j)+14\right) \right) q^n\equiv 0\pmod{64}; \qquad j=1,2,3,4.$$