Some congruences for 12-coloured generalized Frobenius partitions (Q6622902)

In this article, the authors establish a expression for \(C\Phi_{12}(q)\) (Theorem 1.1, eqn. (1.3)), and by utilizing a general congruence relation by \textit{H. H. Chan} et al. [Trans. Am. Math. Soc. 371, No. 3, 2159--2205 (2019; Zbl 1402.05007), eqns. (6.28)--(6.29)], they prove that for any a\(n\ge{0}\); \(c\phi_{12}(3n+1)\equiv 0\pmod 9\) and \(c\phi_{12}(3n+2)\equiv 0\pmod 9\) (Theorem 1.1, eqn. (1.4)). Further, they prove the congruence modulo \(27\) and \(28\) satisfied by \(c\phi_{12}(n)\) (Theorem 1.2, eqns. (1.5)--(1.7)). At the end, three families of conjectural congruences modulo powers of \(3\) satisfied by \(c\phi_{12}(n)\) (Conjecture 1.4) are also established.