Weak completions of paratopological groups

Abstract

Given a T0 paratopological group G and a class C of continuous homomorphisms of paratopological groups, we define the C-semicompletion C[G) and C-completion C[G] of the group G that contain G as a dense subgroup, satisfy the T0-separation axiom and have certain universality properties. For special classes C, we present some necessary and sufficient conditions on G in order that the (semi)completions C[G) and C[G] be Hausdorff. Also, we give an example of a Hausdorff paratopological abelian group G whose C-semicompletion C[G) fails to be a T1-space, where C is the class of continuous homomorphisms of sequentially compact topological groups to paratopological groups. In particular, the group G contains an ω-bounded sequentially compact subgroup H such that H is a topological group but its closure in G fails to be a subgroup.