On the asymptotic formula in Waring's problem with shifts
Abstract
We show that for integers k≥ 4 and s≥ k2+(3k-1)/4, we have an asymptotic formula for the number of solutions, in positive integers xi, to the inequality |(x1-θ1)k+…c+(xs-θs)k-τ|<η, where θi∈(0,1) with θ1 irrational, η∈(0,1], and τ>0 is sufficiently large. We use Freeman's variant of the Davenport--Heilbronn method, along with a new estimate on the Hardy--Littlewood minor arcs, to obtain this improvement on the original result of Chow.
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