| Proofs of Some Conjectures of Andrews and Paule on 2-Elongated Plane Partitions |
| Received:January 03, 2024 Revised:May 09, 2024 |
| Key Words:
partitions congruences 2-elongated plane partitions theta function identities
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| Fund Project:Supported by the National Natural Science Foundation of China (Grant No.12371334) and the Natural Science Foundation of Jiangsu Province (Grant No.BK20221383). |
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| Abstract: |
| Recently, Andrews and Paule established the generating functions for the $k$-elongated plane partition function $d_k(n)$ and proved a large number of results on $d_k(n)$ with $k=2,3$. In particular, they posed some conjectures on congruences modulo powers of 3 for $d_2(n)$. Their work has attracted the attention of da Silva, Hirschhorn, Sellers and Smoot. Very recently, Smoot proved a congruence family for $d_2(n)$ which implies one conjecture due to Andrews and Paule by using the localization method. In this paper, we prove the rest two conjectures given by Andrews and Paule. |
| Citation: |
| DOI:10.3770/j.issn:2095-2651.2024.06.003 |
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