A presentation for the unipotent group over rings with identity
Publication
, Journal Article
Biss, DK; Dasgupta, S
Published in: Journal of Algebra
March 15, 2001
For a ring R with identity, define Unipn(R) to be the group of upper-triangular matrices over R all of whose diagonal entries are 1. For i = 1,2,...,n - 1, let Si denote the matrix whose only nonzero off-diagonal entry is a 1 in the ith row and (i + 1)st column. Then for any integer m (including m = 0), it is easy to see that the Si generate Unipn(Z/mZ). Reiner gave relations among the Si which he conjectured gave a presentation for Unipn(Z/2Z). This conjecture was proven by Biss [Comm. Algebra26 (1998), 2971-2975] and an analogous conjecture was made for Unipn(Z/mZ) in general. We prove this conjecture, as well as a generalization of the conjecture to unipotent groups over arbitrary rings. © 2001 Academic Press.
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Published In
Journal of Algebra
DOI
ISSN
0021-8693
Publication Date
March 15, 2001
Volume
237
Issue
2
Start / End Page
691 / 707
Related Subject Headings
- General Mathematics
- 0101 Pure Mathematics
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Biss, D. K., & Dasgupta, S. (2001). A presentation for the unipotent group over rings with identity. Journal of Algebra, 237(2), 691–707. https://doi.org/10.1006/jabr.2000.8604
Biss, D. K., and S. Dasgupta. “A presentation for the unipotent group over rings with identity.” Journal of Algebra 237, no. 2 (March 15, 2001): 691–707. https://doi.org/10.1006/jabr.2000.8604.
Biss DK, Dasgupta S. A presentation for the unipotent group over rings with identity. Journal of Algebra. 2001 Mar 15;237(2):691–707.
Biss, D. K., and S. Dasgupta. “A presentation for the unipotent group over rings with identity.” Journal of Algebra, vol. 237, no. 2, Mar. 2001, pp. 691–707. Scopus, doi:10.1006/jabr.2000.8604.
Biss DK, Dasgupta S. A presentation for the unipotent group over rings with identity. Journal of Algebra. 2001 Mar 15;237(2):691–707.
Published In
Journal of Algebra
DOI
ISSN
0021-8693
Publication Date
March 15, 2001
Volume
237
Issue
2
Start / End Page
691 / 707
Related Subject Headings
- General Mathematics
- 0101 Pure Mathematics