Steep uncountable groups

Abstract

We produce a simple group G of cardinality 1 which is Artinian (every strictly descending chain of subgroups is finite), satisfies a Burnside law and such that for each uncountable subset Y ⊂eq G there exists a natural number nY for which every element of G may be expressed as a product of length at most nY of elements in Y 1. In particular this group is J\'onsson (every proper subgroup is of strictly smaller cardinality) and strongly bounded (every abstract action on a metric space has bounded orbits); this is the first example of an uncountable group having both of these properties which is constructed without using the continuum hypothesis. The group G can also be made so that all subgroups are simple and all nontrivial subgroups are malnormal in G.