On the power of the discriminant of a univariate polynomial as a certain determinant in positive characteristic

Abstract

Let p be a prime. Suppose that integers r, e, d such that r 2, e 0, 0 d p are given. Let f(x)=s0 xr + s1 xr-1 + ·s + sr be a generic polynomial of degree r in characteristic p. We put f(x)e=Σi 0 ci xi. We define a d× d matrix Md(f(x)e) by Md(f(x)e) = ( ci p + j - d -1)1 i,\, j d. In this paper, we shall be concerned with the divisibility of Md(f(x)e) by powers of the discriminant Δ(f(x)) of f(x). First, assuming s0=1, we study the condition under which Md(f(x)e) is a positive power of Δ(f(x)) multiplied by a non-zero constant in Fp. Second, for such matrices when d=r-1, we present a formula for Md(f(x)e)-1 Md(f(x)e+1) involving the Bézout matrix of f'(x) and f(x)-1r x f'(x). Finally, we present two similar experimental equalities, the first of which involves the determinant Md(f(x)e).