Moment Estimates and Discrepancy for Sums of Square Roots Modulo One

Abstract

Let k 2 be fixed. We study the distribution modulo one of the nk sums equation* a1 + ·s + ak, 1 a1, …, ak n, equation* counted with multiplicity. For equation* S(h,n) = Σn/2 a n e(ha), e(x) = (2πi x), equation* we prove second- and fourth-moment estimates matching the diagonal scale up to a factor n. More precisely, equation* ΣH/2 h H | S(h,n) |2 ,δ Hn1+ equation* uniformly for H n1/2+δ, and equation* ΣH/2 h H | S(h,n) |4 ,δ Hn2+ equation* uniformly for n1/2+δ H n2/3, where 0<δ<1/6 in the fourth-moment estimate. Combining the second-moment bound with pointwise exponential-sum estimates and the Erdős--Turán inequality, we obtain equation* Dk(n) n-ρk+o(1), ρk = 71k+2626k+116, equation* as n∞, where Dk(n) denotes the discrepancy with respect to arbitrary subintervals of [0,1).