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A determinant of symmetric forms

Authors:	K.V Menon

Affiliation:	Department of Mathematics, University of Benin, Benin City, Nigeria

Abstract:	Let Δ(α + β) = \|H_λ₂?r+1\| where H_r is the complete symmetric function in (α₁ + β₁), (α₂ + β₂), …, (α_n + β_n). It is proved that Δ(α + β) ? Δ(α) + Δ(β). This inequality is generalised for certain symmetric functions defined by Littlewood. Let $Ω(α + β) = \|Q_{λ_{2}?r+1}^{staggered(α + β)} (t, k_{1}, k_{2}, …, k_{m})\|$ . Then we prove that Ω(α + β) ? Ω(α) + Ω(β). Here λ₁, λ₂, λ₃, …, λ_n is a partition such that λ_n > λ_n?1 > ··· > λ₂ > λ₁.

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