Infinite monochromatic sumsets for colourings of the reals
Abstract
N. Hindman, I. Leader and D. Strauss proved that it is consistent that there is a finite colouring of R so that no infinite sumset X+X=\x+y:x,y∈ X\ is monochromatic. Our aim in this paper is to prove a consistency result in the opposite direction: we show that, under certain set-theoretic assumptions, for any c: R r with r finite there is an infinite X⊂eq R so that c is constant on X+X.
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