Strong Bounds for 3-Progressions
Abstract
We show that for some constant β > 0, any subset A of integers \1,…,N\ of size at least 2-O(( N)β) · N contains a non-trivial three-term arithmetic progression. Previously, three-term arithmetic progressions were known to exist only for sets of size at least N/( N)1 + c for a constant c > 0. Our approach is first to develop new analytic techniques for addressing some related questions in the finite-field setting and then to apply some analogous variants of these same techniques, suitably adapted for the more complicated setting of integers.
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