Continuous selections, prime number and a covering type property

Abstract

Let (X,τ) be a Hausdorff space and n∈ω. We prove that if X admits a continuous selection over Fn(X) (nonempty subsets of X of cardinality at most n), then for every n≤ m≤ 2n such that m is not a prime number, X admits a continuous selection over [X]m (subsets of X of cardinality m). As a consequence of this, a space X admits a continuous selection for every natural number if and only if the same is true for every prime number. For Hausdorff spaces (X,τ) which admit continuous selections over [X]2, we characterize the existence of continuous selections over [X]n for n≥ 2, in terms of a covering-type property.