English

Weakly $\sqrt{J}U$ Rings

Rings and Algebras 2026-02-17 v1 Representation Theory

Abstract

We introduce and study the so-called {\it weakly JU\sqrt{J}U rings} (hereafter abbreviated as {\it WJUW\sqrt{J}U rings} for short), in which every unit is of the form j+1j+1 or j1j-1 for some jj in J(R):={xR:xnJ(R) for some n1}\sqrt{J(R)} : = \{x \in R : x^n \in J(R) \text{ for some } n\ge 1\}. This class of rings non-trivially generalizes the classes of JU\sqrt{J}U, UUUU, JUJU, WUUWUU and WJUWJU rings, respectively. We investigate their basic properties showing that they are Dedekind-finite, that Mn(R)M_n(R) is never WJUW\sqrt{J}U for n2n\ge 2, and that when char(R)>0\operatorname{char}(R)>0 it must be equal to 2α3β2^\alpha 3^\beta for some α,βN{0}\alpha, \beta \in \mathbb{N} \cup \left\{ 0 \right\}. Moreover, for group rings RGRG, we prove that if RGRG is WJUW\sqrt{J}U, then RR is WJUW\sqrt{J}U and GG is a torsion group. In addition, when RR has positive characteristic and GG is a locally finite pp-group, we give a complete characterization like this: RGRG is a WJUW\sqrt{J}U ring if, and only if, either RR is a JU\sqrt{J}U ring and GG is a 22-group, or RR is a WJUW\sqrt{J}U ring with 3J(R)3\in J(R) and GG is a 33-group, or RR1×R2R\cong R_1\times R_2 with R1R_1 a JU\sqrt{J}U ring, R2R_2 a WJUW\sqrt{J}U ring and GG a trivial group. Our results substantially improve on recent achievements due to Saini and Udar in Czech. Math. J. (2025).

Keywords

Cite

@article{arxiv.2602.14610,
  title  = {Weakly $\sqrt{J}U$ Rings},
  author = {Zari Vesali Mahmood and Ahmad Moussavi and Peter Danchev},
  journal= {arXiv preprint arXiv:2602.14610},
  year   = {2026}
}

Comments

20 pages

R2 v1 2026-07-01T10:38:15.479Z