English

The quotient Unimodular Vector group is nilpotent

Commutative Algebra 2020-01-22 v1 Representation Theory

Abstract

Jose-Rao introduced and studied the Special Unimodular Vector group SUmr(R)SUm_r(R) and EUmr(R)EUm_r(R), its Elementary Unimodular Vector subgroup. They proved that for r2r \geq 2, EUmr(R)EUm_r(R) is a normal subgroup of SUmr(R)SUm_r(R). The Jose-Rao theorem says that the quotient Unimodular Vector group, SUmr(R)/EUmr(R)SUm_r(R)/EUm_r(R), for r2r \geq 2, is a subgroup of the orthogonal quotient group SO2(r+1)(R)/EO2(r+1)(R)SO_{2(r+1)}(R)/EO_{2(r + 1)}(R). The latter group is known to be nilpotent by the work of Hazrat-Vavilov, following methods of A. Bak; and so is the former. In this article we give a direct proof, following ideas of A. Bak, to show that the quotient Unimodular Vector group is nilpotent of class d=dim(R)\leq d = \dim(R). We also use the Quillen-Suslin theory, inspired by A. Bak's method, to prove that if R=A[X]R = A[X], with AA a local ring, then the quotient Unimodular Vector group is abelian.

Cite

@article{arxiv.2001.06976,
  title  = {The quotient Unimodular Vector group is nilpotent},
  author = {Reema Khanna and Selby Jose and Sampat Sharma and Ravi A. Rao},
  journal= {arXiv preprint arXiv:2001.06976},
  year   = {2020}
}
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