Xuancheng Shao scite author profile

Abstract. In this paper we prove two results concerning Vinogradov's three primes theorem with primes that can be called almost twin primes. First, for any m, every sufficiently large odd integer N can be written as a sum of three primes p 1 , p 2 and p 3 such that, for each i ∈ {1, 2, 3}, the interval [p i , p i + H] contains at least m primes, for some H = H(m). Second, every sufficiently large integer N ≡ 3 (mod 6) can be written as a sum of three primes p 1 , p 2 and p 3 such that, for each i ∈ {1, 2, 3}, p i + 2 has at most two prime factors.

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Bombieri-Vinogradov for multiplicative functions, and beyond the x1/2-barrier

Granville

Shao

2019

Advances in Mathematics

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Part-and-parcel of the study of "multiplicative number theory" is the study of the distribution of multiplicative functions in arithmetic progressions. Although appropriate analogies to the Bombieri-Vingradov Theorem have been proved for particular examples of multiplicative functions, there has not previously been headway on a general theory; seemingly none of the different proofs of the Bombieri-Vingradov Theorem for primes adapt well to this situation. In this article we find out why such a result has been so elusive, and discover what can be proved along these lines and develop some limitations. For a fixed residue class a we extend such averages out to moduli ≤ x 20 39 −δ .

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Upper Tail Large Deviations for Arithmetic Progressions in a Random Set

Bhattacharya

Ganguly

Shao

et al. 2018

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Let X k denote the number of k-term arithmetic progressions in a random subset of Z/N Z or {1, . . . , N } where every element is included independently with probability p. We determine the asymptotics of log P(X k ≥ (1 + δ)EX k ) (also known as the large deviation rate) where p → 0 with p ≥ N −c k for some constant c k > 0, which answers a question of Chatterjee and Dembo. The proofs rely on the recent nonlinear large deviation principle of Eldan, which improved on earlier results of Chatterjee and Dembo. Our results complement those of Warnke, who used completely different methods to estimate, for the full range of p, the large deviation rate up to a constant factor.

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Type-II/III DCT/DST algorithms with reduced number of arithmetic operations

Shao

Johnson

2008

Signal Processing

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A density version of the Vinogradov three primes theorem

Shao¹

2014

Duke Math. J.

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Xuancheng Shao

Vinogradov’s three primes theorem with almost twin primes

Bombieri-Vinogradov for multiplicative functions, and beyond the x1/2-barrier

Upper Tail Large Deviations for Arithmetic Progressions in a Random Set

Type-II/III DCT/DST algorithms with reduced number of arithmetic operations

A density version of the Vinogradov three primes theorem

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