Cusps of primes in dense subsequences -- Bypassing the W-trick
Abstract
Let the A-cusps of a dense subset P*∈[N,N] of primes be points α∈R/Z that are such that |Σp∈P* e(α p)| |P*|/A. We establish that any (1/N)-well spaced subset of A-cusps contains at most 20A2K(2A) points, where K=N/(|P*| N). We further show that any B-cusps~ is accompanied, when B A, by a large proportion of A-cusps of the shape +(a/q). We conclude this study by showing that, given A2, the characteristic function 1P* may be decomposed in the form 1P*=(V(z0) N)-1f +f where the trigonometric polynomial of f takes only values |P*|/A, and~f is a bounded non-negative function supported on the integers prime to M; the parameters z0 and M are given in terms of~A, while V(z0)=Πp<z0(1-1/p). The function f satisfies more regularity properties. In particular, its density with respect to the integers N and coprime to~M is again~K. This transfers questions on~P* to problems on integers coprime to the modulus~M.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.