On groups of homeomorphisms of the interval with finitely many fixed points

Abstract

We strengthen the results of A1, consequently, we improve the claims of A2 obtaining the best possible results. Namely, we prove that if a subgroup of Diff+(I) contains a free semigroup on two generators then is not C0-discrete. Using this, we extend the H\"older's Theorem in Diff+(I) classifying all subgroups where every non-identity element has at most N fixed points. In addition, we obtain a non-discreteness result in a subclass of homeomorghisms which allows to extend the classification result to all subgroups of Homeo+(I) where every non-identity element has at most N fixed points.