Proof of a Conjecture on 6-colored Generalized Frobenius Partitions
Abstract
Let cφk(n) be the k-colored generalized Frobenius partition function. By employing the generating function of cφ6(3n+1) found by Hirschhorn, we prove that cφ6(27n+16) 0 (mod 243). This confirms a conjecture of E.X.W. Xia. We also find a congruence relation cφ6(81n+61) 3 cφ6(9n+7) (mod 243). Moreover, we show that cφ6(81n+61) 0 (mod 81), cφ6(243n+142) 0 (mod 243) and cφ6(729n+ 547) 0 (mod 243). We further conjecture that for n 0, cφ6(243n+142) 0 (mod 729).
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