Homomorphism reductions on Polish groups

Abstract

In an earlier paper, we introduced the following pre-order on the subgroups of a given Polish group: if G is a Polish group and H,L ⊂eq G are subgroups, we say H is homomorphism reducible to L iff there is a continuous group homomorphism : G → G such that H = -1 (L). We previously showed that there is a Kσ subgroup, L, of the countable power of any locally compact Polish group, G, such that every Kσ subgroup of Gω is homomorphism reducible to L. In the present work, we show that this fails in the countable power of the group of increasing homeomorphisms of the unit interval.