Counting Polynomials with Distinct Zeros in Finite Fields

Abstract

Let Fq be a finite field with q=pe elements, where p is a prime and e≥ 1 is an integer. Let <n be two positive integers. Fix a monic polynomial u(x)=xn +un-1xn-1+·s +u+1x+1 ∈ Fq[x] of degree n and consider all degree n monic polynomials of the form f(x) = u(x) + v(x), \ v(x)=a x+a-1x-1+·s+a1x+a0∈ Fq[x]. For integer 0≤ k ≤ min\n,q\, let Nk(u(x),) denote the total number of v(x) such that u(x)+v(x) has exactly k distinct roots in Fq, i.e. Nk(u(x),)=|\f(x)=u(x)+vl(x)\ |\ f(x)\ has\ exactly\ k\ distinct\ zeros\ in\ Fq\|. In this paper, we obtain explicit combinatorial formulae for Nk(u(x),) when n- is small, namely when n-= 1, 2, 3. As an application, we define two kinds of Wenger graphs called jumped Wenger graphs and obtain their explicit spectrum.