Improved Bounds for Szemer\'edi's Theorem
Abstract
Let rk(N) denote the size of the largest subset of [N] = \1,…,N\ with no k-term arithmetic progression. We show that for k 5, there exists ck>0 such that \[rk(N) N(-( N)ck).\] Our proof is a consequence of recent quasipolynomial bounds on the inverse theorem for the Gowers Uk-norm as well as the density increment strategy of Heath-Brown and Szemer\'edi as reformulated by Green and Tao.
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