On Vu's theorem in Waring's problem for thinner sequences

Abstract

Let k∈ N and s≥ k( k+3.20032). Let N0k be the set of k-th powers of nonnegative integers. Assume that is an increasing function tending to infinity with (x)=o( x) and satifying some regularity conditions. Then, there exists a subsequence Xk=Xk(s)⊂N0k for which the number of representations Rs(n;Xk) of each n∈N as n=x1k+…+xsk\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ xik∈Xk satisfies the asymptotic formula Rs(n;Xk) S(n)(n) for almost all natural numbers n, with S(n) being the singular series associated to Waring's problem. If moreover s≥ k( k+4.20032) the above conclusion holds for almost all n∈ [X,X+ X] as X∞. Let T(k) be the least natural number for which it is known that all large integers are the sum of T(k) k-th powers of natural numbers. We also show for k≥ 14 and every s≥ T(k) the existence of a sequence Xk'⊂ N0k satisfying Rs(n;Xk') n for every sufficiently large n. The latter conclusion sharpens a result of Wooley and addresses a question of Vu.

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