On The Solvability of Bilinear Equations in Finite Fields

Abstract

We consider the equation ab + cd = λ, a∈ A, b ∈ B, c∈ C, d ∈ D, over a finite field Fq of q elements, with variables from arbitrary sets A, B, C, D ⊂eq Fq. The question of solvability of such and more general equations has recently been considered by D. Hart and A. Iosevich, who, in particular, proved that if #A #B #C #D q3, then above equation has a solution for any λ ∈ Fq*. Here we show that using bounds of multiplicative character sums allows us to extend the class of sets which satisfy this property.