A structure theorem for sets with doubling 4 + δ

Akshat Mudgal (University of Warwick, UK)

Sat Jul 18, 15:00-15:25 (8 days from now)
Lecture held in Science Center in the CUNY Graduate Center (4th floor).

Abstract: A question of Ben Green asks whether every finite set $A$ of integers with doubling constant $K$ must contain a subset $A'$ of comparable size whose doubling is at most $K + o(1)$ due to some explicit algebraic structure on $A'$. This was previously understood in the regime $K < 4 - o(1)$ by work of Eberhard, Green, and Manners, who showed that one can find such a subset $A'$ with density at least $1/2 + o(1)$ inside a long arithmetic progression. In this talk, I will provide a brief survey of this question as well as mention some new progress towards this. This is joint work with Yifan Jing.

number theory

Audience: researchers in the topic


Combinatorial and additive number theory seminar (CANT 2026)

Organizer: Mel Nathanson*
*contact for this listing

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