Distribution of solutions to systems of congruences in balls
Abstract
Let G1,…, Gn∈ Fp[X1,…,Xm] be n polynomials in m variables over the finite field Fp of p elements. For any sufficiently large prime p and non-trivial bounds for the Weyl sums associated to the non-trivial linear combinations of G=(G1,…, Gn), we study various properties regarding the distribution of the vectors by fractional parts equation* (\ G1(x)p\,·s,\ Gn(x)p\)∈ Tn,10pt x∈ Fpm. equation* We prove refinements of equidistribution, such as bounds for the ball discrepancy and variance.
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