Date:
Mon, 09/06/202511:00-12:45
Location:
Hall 110
Title - Quasipolynomial bounds for the corners theorem
Abstract - We prove quasipolynomial bounds for the corners theorem for general abelian groups. The proof draws on a number of themes in additive combinatorics, including recent work of Kelley-Meka on 3-term arithmetic progressions, work on almost periodicity and work of Conlon, Fox, and Zhao on densification.
Based on joint work with Michael Jaber, Yang P Liu, Shachar Lovett and Anthony Ostuni.
Abstract - We prove quasipolynomial bounds for the corners theorem for general abelian groups. The proof draws on a number of themes in additive combinatorics, including recent work of Kelley-Meka on 3-term arithmetic progressions, work on almost periodicity and work of Conlon, Fox, and Zhao on densification.
Based on joint work with Michael Jaber, Yang P Liu, Shachar Lovett and Anthony Ostuni.