Large Sets of Integers with No Harmonic Triples
Abstract
Let f(N) denote the largest size of a set A⊂eq [N]=\1,…,N\ containing no distinct a,b,c such that \[ 2a=1b+1c . \] We prove \[ f(N) N\!(-(2(24/7)+o(1)) N). \] The construction filters the odd integers up to N by a random affine image of a dense three-term-progression-free set in a prime field Fq with q N, and then deletes a controlled family of collapsed triples.
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