Interactions of zeros of of polynomials and multiplicity matrices

Abstract

An m × (n+1) multiplicity matrix is a matrix M = ( μi,j ) with rows enumerated by i ∈ \ 1,\ 2, …, m \ and columns enumerated by j ∈ \ 0,1,…, n \ whose coordinates are nonnegative integers satisfying the following two properties: (1) If μi,j ≥ 1, then j ≤ n-1 and μi,j+1 = μi,j-1, and (2) the jth column sum of M satisfies the inequality Σi=1m μi, j ≤ n-j for all j. Let K be a field of characteristic 0 and let f(x) be a polynomial of degree n with coefficients in K. Let f(j)(x) be the jth derivative of f(x). Let = ( λ1,…, λm) be a sequence of distinct elements of K. For i ∈ \1, 2, …, m \ and j ∈ \1,2,…, n\, let μi,j be the multiplicity of λi as a zero of the polynomial f(j)(x). The m × (n+1) matrix Mf() = ( μi,j ) is called the multiplicity matrix of the polynomial f(x) with respect to . An open problem is to classify the multiplicity matrices that are multiplicity matrices of polynomials in K[x] and to construct multiplicity matrices that are not multiplicity matrices of polynomials.