Distinct coordinate solutions of linear equations over finite fields

Abstract

Let Fq be the finite field of q elements and a1,a2, …, ak, b∈ Fq. We investigate NFq(a1, a2, …,ak;b), the number of ordered solutions (x1, x2, …,xk)∈Fqk of the linear equation a1x1+a2x2+·s+akxk=b with all xi distinct. We obtain an explicit formula for NFq(a1,a2, …, ak;b) involving combinatorial numbers depending on ai's. In particular, we obtain closed formulas for two special cases. One is that ai, 1≤ i≤ k take at most three distinct values and the other is that Σi=1kai=0 and Σi∈ Iai≠ 0 for any I⊂neq [k]. The same technique works when Fq is replaced by Zn, the ring of integers modulo n. In particular, we give a new proof for the main result given by Bibak, Kapron and Srinivasan, which generalizes a theorem of Sch\"onemann via a graph theoretic method.