Schur positivity of difference of products of derived Schur polynomials
Abstract
To any Schur polynomial sλ one can associated its derived polynomials sλ(i) i=0,…,|λ| by the rule sλ(x1+t,…,xn+t) = Σi sλ(i)(x1,…,xn) ti. We conjecture that (sλ(i))2 - sλ(i-1) sλ(i+1) is always Schur positive and prove this when i=1 for rectangles λ = (k), for hooks λ = (k, 1 -1), and when λ = (k,k,1) or λ = (3,2k-1).
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