Partition Frequency Moments: Modularity and Congruences

Abstract

We study frequency moments of partition statistics arising from Euler products A(q)=Πr1(1-qr)-c(r) via a transform that expresses the moment generating functions as B(q) times explicit divisor--sum series determined by c(r). When A(q) is modular (typically an η--quotient), this yields (quasi)modular forms whose coefficients can be projected to arithmetic progressions and certified modulo primes by a Sturm bound, giving an effective pipeline for detecting and proving Ramanujan--type congruences for frequency moments. For ordinary partitions we recover and certify several congruences for odd moments in nonzero residue classes (e.g.\ M3(7n+5) 07 and M3(11n+6) 011). As a second input, we apply the same pipeline to overpartitions and certify a family of zero--class congruences Mm\ ( n) 0 (including m=5,7,11,13), exhibiting a sharp contrast with the ordinary partition case: no nonzero residue--class congruences are observed for overpartition moments in our scan range. We also demonstrate that filtering the statistic via the Glaisher--character dictionary can itself create new Ramanujan--type progressions, e.g.\ a quadratic twist yields the certified congruence M53(5n+4) 05.