Some implications of Ramsey Choice for n-element sets

Abstract

Let n∈ω. The weak choice principle RCn states that for every infinite set x there is an infinite subset y⊂eq x with a choice function on [y]n:=\z⊂eq y z =n\. Cn- states that for every infinite family of n-element sets, there is an infinite subfamily G⊂eqF with a choice function. LOCn- and WOCn- are the same statement but we assume that the family F is linearly orderable (LOCn-) or well-orderable (WOCn-). In the first part of this paper we will give a full characterization of when the implication RCm⇒ WOCn- with m,n∈ω holds in ZF. We will prove the independence results by using suitable Fraenkel-Mostowski permutation models. In the second part of we will show some generalizations. In particular we will show that RC5⇒ LOC5- and RC6⇒ C3-, answering two open questions from Halbeisen and Tachtsis. Furthermore we will show that RC6⇒ C9- and RC7⇒ LOC7-.

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