New Hindman spaces

Abstract

We introduce a method that allows to turn topological questions about Hindman spaces into purely combinatorial questions about the Katetov order of ideals on N. We also provide two applications of the method. (1) We characterize Fσ ideals I for which there is a Hindman space which is not an I-space under the continuum hypothesis. This reduces a topological question of Albin L. Jones about consistency of existence of a Hindman space which is not van der Waerden to the question whether the ideal of all non AP-sets is not below the ideal of all non IP-sets in the Katetov order. (2) Under the continuum hypothesis, we construct a Hindman space which is not an I1/n-space. This answers a question posed by Jana Flaskov\'a at the 22nd Summer Conference on Topology and its Applications.