Hartosh Singh Bal, Gaurav Bhatnagar
Published 2021-02-06Version 1
We give a new proof of a partition theorem popularly known as Elder's theorem, but which is also credited to Stanley and Fine. We extend the theorem to the context of colored partitions (or prefabs). More specifically, we give analogous results for $b$-colored partitions, where each part occurs in $b$ colors; for $b$-colored partitions with odd parts (or distinct parts); for partitions where the part $k$ comes in $k$ colors; and, overpartitions.
Congruences modulo powers of 5 for $k$-colored partitions
A proposed crank for $(k+j)$-colored partitions, with $j$ colors having distinct parts
Colored partitions and the hooklength formula: partition statistic identities
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