TY - JOUR
T1 - Relative commutator calculus in Chevalley groups
AU - Hazrat, Roozbeh
AU - Vavilov, Nikolai
AU - Zhang, Zuhong
PY - 2013/7/1
Y1 - 2013/7/1
N2 - We revisit localisation and patching method in the setting of Chevalley groups. Introducing certain subgroups of relative elementary Chevalley groups, we develop relative versions of the conjugation calculus and the commutator calculus in Chevalley groups G(Φ, R), rk(Φ) ≥ 2, which are both more general, and substantially easier than the ones available in the literature. For classical groups such relative commutator calculus has been recently developed by the authors in Hazrat, Zhang (2011) [34], Hazrat et al. (2011) [33]. As an application we prove the mixed commutator formula,. [E(Φ,R,a),G(Φ,R,b)]=[E(Φ,R,a),E(Φ,R,b)], for two ideals a,b⊴R. This answers a problem posed in a paper by Alexei Stepanov and the second author.
AB - We revisit localisation and patching method in the setting of Chevalley groups. Introducing certain subgroups of relative elementary Chevalley groups, we develop relative versions of the conjugation calculus and the commutator calculus in Chevalley groups G(Φ, R), rk(Φ) ≥ 2, which are both more general, and substantially easier than the ones available in the literature. For classical groups such relative commutator calculus has been recently developed by the authors in Hazrat, Zhang (2011) [34], Hazrat et al. (2011) [33]. As an application we prove the mixed commutator formula,. [E(Φ,R,a),G(Φ,R,b)]=[E(Φ,R,a),E(Φ,R,b)], for two ideals a,b⊴R. This answers a problem posed in a paper by Alexei Stepanov and the second author.
KW - Chevalley groups
KW - Commutator formulae
KW - Elementary subgroups
KW - Localisation-completion
KW - Quillen-Suslin lemma
UR - http://www.scopus.com/inward/record.url?scp=84876483563&partnerID=8YFLogxK
U2 - 10.1016/j.jalgebra.2013.03.011
DO - 10.1016/j.jalgebra.2013.03.011
M3 - Article
AN - SCOPUS:84876483563
SN - 0021-8693
VL - 385
SP - 262
EP - 293
JO - Journal of Algebra
JF - Journal of Algebra
ER -