On the set of optimal homeomorphisms for the natural pseudo-distance associated with the Lie group S1

Abstract

If and are two continuous real-valued functions defined on a compact topological space X and G is a subgroup of the group of all homeomorphisms of X onto itself, the natural pseudo-distance dG(,) is defined as the infimum of L(g)=\|- g \|∞, as g varies in G. In this paper, we make a first step towards extending the study of this concept to the case of Lie groups, by assuming X=G=S1. In particular, we study the set of the optimal homeomorphisms for dG, i.e. the elements α of S1 such that L(α) is equal to dG(,). As our main results, we give conditions that a homeomorphism has to meet in order to be optimal, and we prove that the set of the optimal homeomorphisms is finite under suitable conditions.