An improvement to the Kelley-Meka bounds on three-term arithmetic progressions
Abstract
In a recent breakthrough Kelley and Meka proved a quasipolynomial upper bound for the density of sets of integers without non-trivial three-term arithmetic progressions. We present a simple modification to their method that strengthens their conclusion, in particular proving that if A⊂\1,…,N\ has no non-trivial three-term arithmetic progressions then \[ A ≤ (-c( N)1/9)N\] for some c>0.
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