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We show that a finite coloring of an amenable group contains `many' monochromatic sets of the form \x, y, xy, yx\, and natural extensions with more variables. This gives the first combinatorial proof and extensions of Bergelson and McCutcheon's non-commutative Schur theorem. Our main new tool is the introduction of what we call `quasirandom colorings, ' a condition that is automatically satisfied by colorings of quasirandom groups, and a reduction to this case.
Matt Bowen (Mon,) studied this question.
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