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http://dx.doi.org/10.4134/BKMS.2008.45.3.445

ON SOME PROPERTIES OF MALCEV-NEUMANN MODULES  

Zhao, Renyu (COLLEGE OF ECONOMICS AND MANAGEMENT NORTHWEST NORMAL UNIVERSITY)
Liu, Zhongkui (COLLEGE OF ECONOMICS AND MANAGEMENT NORTHWEST NORMAL UNIVERSITY)
Publication Information
Bulletin of the Korean Mathematical Society / v.45, no.3, 2008 , pp. 445-456 More about this Journal
Abstract
Let M be a right R-module, G an ordered group and ${\sigma}$ a map from G into the group of automorphisms of R. The conditions under which the Malcev-Neumann module M* ((G)) is a PS module and a p.q.Baer module are investigated in this paper. It is shown that: (1) If $M_R$ is a reduced ${\sigma}$-compatible module, then the Malcev-Neumann module M* ((G)) over a PS-module is also a PS-module; (2) If $M_R$ is a faithful ${\sigma}$-compatible module, then the Malcev-Neumann module M* ((G)) is a p.q.Baer module if and only if the right annihilator of any G-indexed family of cyclic submodules of M in R is generated by an idempotent of R.
Keywords
Malcev-Neumann module; Malcev-Neumann ring; PS-module; p.q.Baer module;
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