Effective bounds for Roth's theorem with shifted square common difference
Abstract
Let S be a subset of \1,…,N\ avoiding the nontrivial progressions x, x+y2-1, x+ 2(y2-1). We prove that |S| N/mN, where m is the m-fold iterated logarithm and m∈N is an absolute constant. This answers a question of Green.
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