Hook lengths in self-conjugate partitions
Abstract
In 2010, G.-N. Han obtained the generating function for the number of size t hooks among integer partitions. Here we obtain these generating functions for self-conjugate partitions, which are particularly elegant for even t. If nt(λ) is the number of size t hooks in a partition λ, then for even t we have Σλ∈ SC xnt(λ) qλ = (-q;q2)∞ · ((1-x2)q2t;q2t)∞t2. As a consequence, if at*(n) is the number of such hooks among the self-conjugate partitions of n, then for even t we obtain the simple formula at*(n)=tΣj≥ 1 q*(n-2tj), where q*(m) is the number of partitions of m into distinct odd parts. As a corollary, we find that t at*(n), which confirms a conjecture of Ballantine, Burson, Craig, Folsom, and Wen.
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