Reconstructing Partitions from their Multisets of k-Minors

Abstract

For non-negative integers n and k with n k, a k-minor of a partition λ = [λ1, λ2, …] of n is a partition μ = [μ1, μ2, …] of n-k such that μi λi for all i. The multiset Mk(λ) of k-minors of λ is defined as the multiset of k-minors μ with multiplicity of μ equal to the number of standard Young tableaux of skew shape λ / μ. We show that there exists a function G(n) such that the partitions of n can be reconstructed from their multisets of k-minors if and only if k G(n). Furthermore, we prove that n → ∞ G(n)/n = 1 with n-G(n) = O(n/ n). As a direct consequence of this result, the irreducible representations of the symmetric group Sn can be reconstructed from their restrictions to Sn-k if and only if k G(n) for the same function G(n). For a minor μ of the partition λ, we study the excitation factor Eμ (λ), which appears as a crucial part in Naruse's Skew-Shape Hook Length Formula. We observe that certain excitation factors of λ can be expressed as a Q[k]-linear combination of the elementary symmetric polynomials of the hook lengths in the first row of λ where k = λ1 is the number of cells in the first row of λ.