Your search keyword '"Šter, Janez"' showing total 3 results

1. Examples of strongly clean rings.

Author

Šter, Janez

Subjects

INTEGRAL domains, POWER series

Abstract

A ring is called strongly clean if each of its elements can be written as the sum of an idempotent and a unit which commute. In this paper, we deal with two questions: first, is the center of a strongly clean ring R strongly clean, and second, is the power series ring over a strongly clean ring R strongly clean? Both questions have a positive answer when R is optimally clean, which is slightly more than strongly clean. We show that in general the questions have a negative answer, by giving, for any integral domain k, a strongly clean ring R such that and is not strongly clean. Moreover, we show that the optimally clean property is not a necessary condition for the answer to be positive, by giving, for any integral domain k, a strongly clean ring R such that and is strongly clean, but R is not optimally clean. [ABSTRACT FROM AUTHOR]

Published

2019

2. The clean property is not a Morita invariant.

Author

Šter, Janez

Subjects

*INVARIANTS (Mathematics), *MATHEMATICAL symmetry, *RING theory, *MATRIX rings, *ASSOCIATIVE rings, *GROUP theory

Abstract

For each n ≥ 2 , we construct a ring R such that the matrix ring M n ( R ) is clean and M k ( R ) is not clean for k < n . This answers in negative the question posed by Han and Nicholson [11] whether the clean property is Morita invariant. [ABSTRACT FROM AUTHOR]

Published

2014

3. Corner Rings of a Clean Ring Need Not be Clean.

Author

Šter, Janez

Subjects

RING theory, IDEMPOTENTS, LINEAR algebra, MATHEMATICAL analysis, MATRICES (Mathematics), ASSOCIATIVE algebras

Abstract

We give an example of a clean ring R and an idempotent e ∈ R, such that the corner ring eRe is not clean. [ABSTRACT FROM PUBLISHER]

Published

2012