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An improved upper bound is obtained for the density of sequences of positive integers that contain no k-term geometric progression.

Number Theory · Mathematics 2014-01-03 Melvyn B. Nathanson , Kevin O'Bryant

It is known that if a subset of $\mathbb{R}$ has positive Lebesgue measure, then it contains arbitrarily long finite arithmetic progressions. We prove that this result does not extend to infinite arithmetic progressions in the following…

Classical Analysis and ODEs · Mathematics 2023-04-21 Laurestine Bradford , Hannah Kohut , Yuveshen Mooroogen

Green and Tao famously proved in 2005 that any subset of the primes of fixed positive density contains arbitrarily long arithmetic progressions. Green had previously shown that in fact any subset of the primes of relative density tending to…

Number Theory · Mathematics 2019-06-14 Luka Rimanic , Julia Wolf

Assuming $\mathfrak b = \mathfrak c$ (or some weaker statement), we construct a compactification $\gamma\omega$ of $\omega$ such that its remainder $\gamma\omega\setminus\omega$ is nonseparable and carries a strictly positive measure.

General Topology · Mathematics 2015-01-29 Piotr Drygier , Grzegorz Plebanek

We show that in any two-coloring of the positive integers there is a color for which the set of positive integers that can be represented as a sum of distinct elements with this color has upper logarithmic density at least $(2+\sqrt{3})/4$…

Combinatorics · Mathematics 2022-09-23 David Conlon , Jacob Fox , Huy Tuan Pham

For a subset A of a field F, write A(A + 1) for the set {a(b + 1):a,b\in A}. We establish new estimates on the size of A(A+1) in the case where F is either a finite field of prime order, or the real line. In the finite field case we show…

Combinatorics · Mathematics 2012-08-06 Timothy G. F. Jones , Oliver Roche-Newton

Renling Jin proved that if A and B are two subsets of the natural numbers with positive Banach density, then A+B is piecewise syndetic. In this paper, we prove that, under various assumptions on positive lower or upper densities of A and B,…

Number Theory · Mathematics 2017-08-09 Mauro Di Nasso , Isaac Goldbring , Renling Jin , Steven Leth , Martino Lupini , Karl Mahlburg

We provide a multidimensional extension of previous results on the existence of polynomial progressions in dense subsets of the primes. Let $A$ be a subset of the prime lattice - the d-fold direct product of the primes - of positive…

Number Theory · Mathematics 2025-04-22 Andrew Lott , Ákos Magyar , Giorgis Petridis , János Pintz

Let a be a real number between 0 and 1. Ernie Croot showed that the quantity \max_A #(3-term arithmetic progressions in A)/p^2, where A ranges over all subsets of Z/pZ of size at most a*p, tends to a limit as p tends to infinity through…

Number Theory · Mathematics 2014-02-26 Ben Green , Olof Sisask

Given a set $A\subseteq\mathbb{N}$, we consider the relationship between stability of the structure $(\mathbb{Z},+,0,A)$ and sparsity of the set $A$. We first show that a strong enough sparsity assumption on $A$ yields stability of…

Logic · Mathematics 2020-05-22 Gabriel Conant

We adapt the construction of subsets of {1, 2, ..., N} that contain no k-term arithmetic progressions to give a relatively thick subset of an arbitrary set of N integers. Particular examples include a thick subset of {1, 4, 9, ..., N^2}…

Number Theory · Mathematics 2010-06-25 Kevin O'Bryant

Our main result is that if A is a finite subset of an abelian group with |A+A| < K|A|, then 2A-2A contains an O(log^{O(1)} K)-dimensional coset progression M of size at least exp(-O(log^{O(1)} K))|A|.

Classical Analysis and ODEs · Mathematics 2012-12-04 Tom Sanders

Consider the congruence class R_m(a)={a+im:i\in Z} and the infinite arithmetic progression P_m(a)={a+im:i\in N_0}. For positive integers a,b,c,d,m the sum of products set R_m(a)R_m(b)+R_m(c)R_m(d) consists of all integers of the form…

Number Theory · Mathematics 2016-12-30 Sergei V. Konyagin , Melvyn B. Nathanson

We show that a finite set of integers $A \subseteq \mathbb{Z}$ with $|A+A| \le K |A|$ contains a large piece $X \subseteq A$ with Fre\u{i}man dimension $O(\log K)$, where large means $|A|/|X| \ll \exp(O(\log^2 K))$. This can be thought of…

Combinatorics · Mathematics 2016-06-06 Freddie Manners

A celebrated and deep result of Green and Tao states that the primes contain arbitrarily long arithmetic progressions. In this note I provide a straightforward argument demonstrating that the primes get arbitrarily close to arbitrarily long…

Classical Analysis and ODEs · Mathematics 2019-09-20 Jonathan M. Fraser

We solve the enumeration of the set $\textrm{AP}(n)$ of partitions of a positive integer $n$ in which the nondecreasing sequence of parts forms an arithmetic progression. In particular, we establish a formula for the number of nondecreasing…

Number Theory · Mathematics 2022-06-13 F. Javier de Vega

Various authors, including McNew, Nathanson and O'Bryant, have recently studied the maximal asymptotic density of a geometric progression free sequence of positive integers. In this paper we prove the existence of geometric progression free…

Number Theory · Mathematics 2017-07-19 Xiaoyu He

Given a finite set of integers $A$, its sumset is $A+A:= \{a_i+a_j \mid a_i,a_j\in A\}$. We examine $|A+A|$ as a random variable, where $A\subset I_n = [0,n-1]$, the set of integers from 0 to $n-1$, so that each element of $I_n$ is in $A$…

Let~$A$ be a set of nonnegative integers. Let~$(h A)^{(t)}$ be the set of all integers in the sumset~$hA$ that have at least~$t$ representations as a sum of~$h$ elements of~$A$. In this paper, we prove that, if~$k \geq 2$,…

Number Theory · Mathematics 2020-12-23 Jun-Yu Zhou , Quan-Hui Yang

For any finite set of integers X, define its sumset X+X to be {x+y: x, y in X}. In a recent paper, Martin and O'Bryant investigated the distribution of |A+A| given the uniform distribution on subsets A of {0, 1, ..., n-1}. They also…

Number Theory · Mathematics 2012-12-24 Oleg Lazarev , Steven J. Miller , Kevin O'Bryant