Owings-like theorems for infinitely many colours or finite monochromatic sets

Abstract

Inspired by Owings's problem, we investigate whether, for a given an Abelian group G and cardinal numbers ,θ, every colouring c:Gθ yields a subset X⊂eq G with |X|= such that X+X is monochromatic. (Owings's problem asks this for G= Z, θ=2 and =0; this is known to be false for the same G and but θ=3.) We completely settle the question for and θ both finite (by obtaining sufficient and necessary conditions for a positive answer) and for and θ both infinite (with a negative answer). Also, in the case where θ is infinite but is finite, we obtain some sufficient conditions for a negative answer as well as an example with a positive answer.