Relatively Orthocomplemented Skew Nearlattices in Rickart Rings

Jānis Cīırulis

首页> 外文期刊>Demonstratio Mathematica >Relatively Orthocomplemented Skew Nearlattices in Rickart Rings

【24h】

Relatively Orthocomplemented Skew Nearlattices in Rickart Rings

机译：Relatively Orthocomplemented Skew Nearlattices in Rickart Rings

获取原文

获取原文并翻译 | 示例

掌桥外文数据库（机构版） >>

开具论文收录证明 >>

文献代查 >>

页面导航

摘要
著录项
相关主题

摘要

A class of (right) Rickart rings, called strong, is isolated. In particular, every Rickart *-ring is strong. It is shown in the paper that every strong Rickart ring R admits a binary operation which turns R into a right normal band having an upper bound property with respect to its natural order ≤; such bands are known as right normal skew nearlattices. The poset (R, ≤) is relatively orthocomplemented; in particular, every initial segment in it is orthomodular. The order ≤ is actually a version of the so called right-star order. The one-sided star orders are well-investigated for matrices and recently have been generalized to bounded linear Hilbert space operators and to abstract Rickart *-rings. The paper demonstrates that they can successfully be treated also in Rickart rings without involution.

著录项

来源
《Demonstratio Mathematica》 |2015年第4期|493-508|共16页
作者
Jānis Cīırulis;
展开▼
作者单位

Institute of Mathematics and Computer Science University of Latvia;

展开▼
收录信息
原文格式 PDF
正文语种英语
中图分类
关键词
orthogonality; relatively orthocomplemented poset; restrictive semigroup; Rickart ring; right normal band; right-star order; skew nearlattice;

Relatively Orthocomplemented Skew Nearlattices in Rickart Rings

摘要

著录项

相关主题

期刊订阅