Distributions of Hook lengths in integer partitions
Abstract
Motivated by the many roles that hook lengths play in mathematics, we study the distribution of the number of t-hooks in the partitions of n. We prove that the limiting distribution is normal with mean μt(n) 6nπ-t2 and variance σt2(n) (π2-6)6n2π3. Furthermore, we prove that the distribution of the number of hook lengths that are multiples of a fixed t≥ 4 in partitions of n converge to a shifted Gamma distribution with parameter k=(t-1)/2 and scale θ=2/(t-1).
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