On the rank of Hankel matrices over finite fields

Abstract

Given three nonnegative integers p,q,r and a finite field F, how many Hankel matrices ( xi+j) 0≤ i≤ p,\ 0≤ j≤ q over F have rank ≤ r ? This question is classical, and the answer (q2r when r≤\ p,q\ ) has been obtained independently by various authors using different tools (Daykin, Elkies, Garcia Armas, Ghorpade and Ram). In this note, we study a refinement of this result: We show that if we fix the first k of the entries x0,x1,…,xk-1 for some k≤ r≤\ p,q\ , then the number of ways to choose the remaining p+q-k+1 entries xk,xk+1,…,xp+q such that the resulting Hankel matrix ( xi+j) 0≤ i≤ p,\ 0≤ j≤ q has rank ≤ r is q2r-k. This is exactly the answer that one would expect if the first k entries had no effect on the rank, but of course the situation is not this simple. The refined result generalizes (and provides an alternative proof of) a result by Anzis, Chen, Gao, Kim, Li and Patrias on evaluations of Jacobi-Trudi determinants over finite fields.