A note on Diagonal sequences of integer partitions

Abstract

Let \(P(n)\) be the set of partitions of the positive integer \(n\). For \(α=(α1,...,αt) ∈ P(n)\) define the diagonal sequence \(δ(α)=(dk(α))k ≥ 1\) via \( dk(α) = \ i \, \, 1 ≤ i ≤ k and αi + i- 1≥ k \ .\) We show that the set of all partitions in \(P(n)\) with the same diagonal sequence is a partially ordered set under majorization with unique maximal and minimal elements and we give an explicit formula for the number of partitions with the same diagonal sequence.

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