A constructive proof for the simple connectedness of finite subset spaces

Abstract

The space of all finite non-empty subsets of a topological space X, also known as the Ran space of X, is weakly contractible for X path connected. We consider subspaces Ran≤slant n(X) of the Ran space given by all subsets of X of size at most n, and their first homotopy groups. These groups are known to be trivial for n≥slant 3 when X is a path connected CW-complex, though the proofs are not constructive. We show that the induced map π1(Ran≤slant n(X)) π1(Ran≤slant n+2(X)) is trivial for all positive integers n, by explicitly drawing the path homotopies that contract any loop in X to a point. From this we get a constructive proof for the triviality of π1(Ran≤slant n(X)), for all n≥slant 4.