Divisibility properties of weighted k regular partitions
Abstract
We study a generalized class of weighted k-regular partitions defined by \[ Σn=0∞ ck, r1, r2(n) qn = Πn=1∞ (1 - qnk)r1(1 - qn)r2, \] which extends the classical k-regular partition function bk(n). We establish new infinite families of Ramanujan-type congruences, divisibility results, and positive-density prime sets for which ck, r1, r2(n) vanishes modulo a given prime.
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