Itzkowitz's problem for group of finite exponent

Abstract

Itzkowitz's problem asks whether every topological group G has equal left and right uniform structures provided that bounded left uniformly continuous real-valued function on G are right uniformly continuous. This paper provides a positive answer to this problem if G is of bounded exponent or, more generally, if there exist an integer p≥ 2 and a nonempty open set U⊂ G such that the power map U g gp∈ G is left (or right) uniformly continuous. This also resolves the problem for periodic groups which are Baire spaces.