On Vu's theorem in Waring's problem for thinner sequences
Abstract
Let and . Let be the set of -th powers of nonnegative integers. Assume that is an increasing function tending to infinity with and satifying some regularity conditions. Then, there exists a subsequence for which the number of representations of each as satisfies the asymptotic formula for almost all natural numbers , with being the singular series associated to Waring's problem. If moreover the above conclusion holds for almost all as . Let be the least natural number for which it is known that all large integers are the sum of -th powers of natural numbers. We also show for and every the existence of a sequence satisfying for every sufficiently large . The latter conclusion sharpens a result of Wooley and addresses a question of Vu.
Cite
@article{arxiv.2410.11832,
title = {On Vu's theorem in Waring's problem for thinner sequences},
author = {Javier Pliego},
journal= {arXiv preprint arXiv:2410.11832},
year = {2025}
}
Comments
47 pages. Deleted some content which will appear in another paper