The Variance of the Sum of Two Squares over Intervals in Fq [T]: I

Abstract

For B ∈ Fq [T] of degree 2n ≥ 2, consider the number of ways of writing B=E2 + γ F2, where γ ∈ Fq* is fixed, and E,F ∈ Fq [T] with deg 0.25em E = n and deg 0.25em F = m < n. We denote this by Sγ ; m (B). We obtain an exact formula for the variance of Sγ ; m (B) over intervals in Fq [T]. We use the method of additive characters and Hankel matrices that the author previously used for the variance and correlations of the divisor function. In Section 2, we give a short overview of our approach; and we briefly discuss the possible extension of our result to the number of ways of writing B=E2 + T F2.