Transfinitely iterated wild sets

Abstract

In this paper, we study homotopical analogues of the Cantor-Bendixson derivative. For each n≥ 0, the "πn-wild set" wn(X) of a topological space X is the subspace of X consisting of the points at which there exists a shrinking sequence of essential based maps Sn X. Since the operator wn permits iteration, every given space X yields a descending transfinite sequence of nested subspaces \wn(X)\ that stabilizes at some smallest ordinal wrkn(X) called the "πn-wild rank" of X. We show that the entire transfinite sequence \ho(wn(X))\ of homotopy types is a homotopy invariant of X and that wrkn(X) can be an arbitrary countable ordinal when X is an n-dimensional Peano continuum. It remains open if there exists a continuum X with uncountable πn-wild rank. This difficulty motivates the parallel study a basepoint-free version fwrkn(X), called the "free πn-wild rank" of X. We show that for every continuum X, fwrkn(X) is always countable and can be any countable ordinal.