On the Divisibility of 7-Elongated Plane Partition Diamonds by Powers of 8
Abstract
In 2021 da Silva, Hirschhorn, and Sellers studied a wide variety of congruences for the k-elongated plane partition function dk(n) by various primes. They also conjectured the existence of an infinite congruence family modulo arbitrarily high powers of 2 for the function d7(n). We prove that such a congruence family exists -- indeed, for powers of 8. The proof utilizes only classical methods, i.e., integer polynomial manipulations in a single function, in contrast to all other known infinite congruence families for dk(n) which require more modern methods to prove.
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