The k-elongated plane partition function modulo small powers of 5

Abstract

Andrews and Paule revisited combinatorial structures known as the k-elongated partition diamonds, which were introduced in connection with the study of the broken k-diamond partitions. They found the generating function for the number dk(n) of partitions obtained by summing the links of such partition diamonds of length n and discovered congruences for dk(n) using modular forms. Since then, congruences for dk(n) modulo certain powers of primes have been proven via elementary means and modular forms by many authors, most recently Banerjee and Smoot who established an infinite family of congruences for d5(n) modulo powers of 5. We extend in this paper the list of known results for dk(n) by proving infinite families of congruences for dk(n) modulo 5,25, and 125 using classical q-series manipulations and 5-dissections.

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