Some notes on topological rings and their groups of units

Abstract

If R is a topological ring then R, the group of units of R, with the subspace topology is not necessarily a topological group. This leads us to the following natural definition: By an absolute topological ring we mean a topological ring such that its group of units with the subspace topology is a topological group. We prove that every commutative ring with the I-adic topology is an absolute topological ring. Next, we prove that if I is an ideal of a ring R then for the I-adic topology over R we have π0(R)=R/(n≥slant1In)=t(R) where π0(R) is the space of connected components of R and t(R) is the space of irreducible closed subsets of R. We observed that the main result of Koh kwangil as well as its corrected form [Chap II, 12, Theorem 12.1]Ursul are not true, and then we corrected this result in the right way. In the Wikipedia pages, it is claimed that ``the identity component of a topological group is always a characteristic subgroup'', we also provide a counterexample to this claim. Finally, we fix a gap in the proof of the fact that every epimorphism of the category of Hausdorff topological spaces has a dense image.