On Proper Colorings of Functions

Abstract

We investigate the infinite version of the k-switch problem of Greenwell and Lov\'asz. Given infinite cardinals and λ, for functions x,y∈ λ we say that they are totally different if x(i) y(i) for each i∈ λ. A function F:λ is a proper coloring if F(x) F(y) whenever x and y are totally different elements of λ . We say that F is weakly uniform iff there are pairwise totally different functions \rα:α<\⊂ λ such that F(rα)=α; F is tight if there is no proper coloring G:λ such that there is exactly one x∈ λ with G(x) F(x). We show that given a proper coloring F:λ , the following statements are equivalent F is weakly uniform, there is a +-complete ultrafilter U on λ and there is a permutation π∈ Symm() such that for each x∈ λ we have F(x)=π(α)\ \ \i∈ λ: x(i)=α\ ∈ U. We also show that there are tight proper colorings which cannot be obtained such a way.

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