Your search keyword '"Local ring"' showing total 3 results

1. Strongly regular matrices revisited.

Author

Chiru, Iulia-Elena, Crivei, Septimiu, and Olteanu, Gabriela

Subjects

*MATRICES (Mathematics), *GROUP algebras, *LOCAL rings (Algebra), *FINITE rings, *RING theory, *MATRIX inversion, *COMMUTATIVE rings, *VON Neumann algebras

Abstract

We prove a necessary condition and a sufficient condition for an n × n -matrix A with determinantal rank ρ (A) = t over an arbitrary commutative ring to be (von Neumann) strongly regular in terms of the trace of its t th compound matrix C t (A). In particular, a non-zero n × n -matrix A with ρ (A) = t over a local commutative ring R is strongly regular if and only if Tr (C t (A)) is a unit in R , and in this case we construct a strong inner inverse of A. We derive applications to products of local commutative rings and group algebras. Finally, we count strongly regular matrices over some finite rings of residue classes and group algebras. [ABSTRACT FROM AUTHOR]

Published

2023

2. Strong cleanness of generalized matrix rings over a local ring

Author

Tang, Gaohua and Zhou, Yiqiang

Subjects

*GENERALIZATION, *MATRIX rings, *LOCAL rings (Algebra), *MULTIPLIERS (Mathematical analysis), *JACOBSON radical, *MATHEMATICAL analysis

Abstract

Abstract: Let K s(R) be the generalized matrix ring over a ring R with multiplier s. For a general local ring R and a central element s in the Jacobson radical of R, necessary and sufficient conditions are obtained for K s(R) to be a strongly clean ring. For a commutative local ring R and an arbitrary element s in R, criteria are obtained for a single element of K s(R) to be strongly clean and, respectively, for the ring K s(R) to be strongly clean. Specializing to s =1 yields some known results. New families of strongly clean rings are presented. [Copyright &y& Elsevier]

Published

2012

3. Congruence of symmetric matrices over local rings

Author

Cao, Yonglin and Szechtman, Fernando

Subjects

*CONGRUENCE lattices, *SYMMETRIC matrices, *LOCAL rings (Algebra), *IDEALS (Algebra), *MATHEMATICAL analysis

Abstract

Abstract: Let be a commutative, local, and principal ideal ring with maximal ideal and residue class field . Suppose that every element of is square. Then the problem of classifying arbitrary symmetric matrices over by congruence naturally reduces, and is actually equivalent to, the problem of classifying invertible symmetric matrices over by congruence. [Copyright &y& Elsevier]

Published

2009