On squares in special sets of finite fields

Abstract

We consider the linear vector space formed by the elements of the finite fields Fq with q=pr over Fp. Let \a1,…,ar\ be a basis of this space. Then the elements x of Fq have a unique representation in the form Σj=1r cjaj with cj∈Fp. Let D1,…,Dr be subsets of Fp. We consider the set W=W(D1,…,Dr) of elements of Fq such that cj ∈ Dj for all j=1,…,r. We give an estimate for the number of squares in the set W which implies an asymptotic formula for this quantity in the case when the sets D1,…,Dr are "large on average" and a sufficient condition for the existence of squares in the set W.