Automorphisms and model-theory questions for Nilpotent matrix groups and rings

Let R ’ = NT( m, S ). The purpose of this paper is to investigate elementary equivalences UT( n,K ) ≡ UT( m, S ) and Λ( R ) ≡ Λ( R ’) for arbitrary associative coefficient rings with identity. The main theorem gives the description of such equivalences for n > 4. In addition, we investigate isomo...

Full description

Saved in:
Bibliographic Details
Published in:Journal of mathematical sciences (New York, N.Y.) Vol. 166; no. 5; pp. 675 - 681
Main Authors: Levchuk, V. M., Minakova, E. V.
Format: Journal Article
Language:English
Published: Boston Springer US 01.05.2010
Subjects:
Mathematics
Mathematics and Statistics
Associative Ring
Elementary Sentence
Adjoint Group
Matrix Ring
Central Idempotent
ISSN:1072-3374, 1573-8795
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:Let R ’ = NT( m, S ). The purpose of this paper is to investigate elementary equivalences UT( n,K ) ≡ UT( m, S ) and Λ( R ) ≡ Λ( R ’) for arbitrary associative coefficient rings with identity. The main theorem gives the description of such equivalences for n > 4. In addition, we investigate isomorphisms and elementary equivalence of Jordan niltriangular matrix rings.
ISSN:1072-3374
1573-8795
DOI:10.1007/s10958-010-9883-3