On the distribution of the Rudin-Shapiro function for finite fields

Abstract

Let q=pr be the power of a prime p and (β1,… ,βr) be an ordered basis of Fq over Fp. For =Σj=1r xjβj∈ Fq with digits xj∈Fp, we define the Rudin-Shapiro function R on Fq by R()=Σi=1r-1 xixi+1, ∈ Fq. For a non-constant polynomial f(X)∈ Fq[X] and c∈ Fp we study the number of solutions ∈ Fq of R(f())=c. If the degree d of f(X) is fixed, r 6 and p→ ∞, the number of solutions is asymptotically pr-1 for any c. The proof is based on the Hooley-Katz Theorem.