Structure of Chevalley groups over commutative rings NA Vavilov Nonassociative algebras and related topics, 219-335, 1991 | 188 | 1991 |
Chevalley groups over commutative rings: I. Elementary calculations N Vavilov, E Plotkin Acta Applicandae Mathematica 45, 73-113, 1996 | 175 | 1996 |
Decomposition of transvections: a theme with variations A Stepanov, N Vavilov K-theory 19 (2), 109-154, 2000 | 174 | 2000 |
Structure of hyperbolic unitary groups I: elementary subgroups A Bak, N Vavilov Algebra Colloquium 7, 159-196, 2000 | 162 | 2000 |
Intermediate subgroups in Chevalley groups NA Vavilov Sonderforschungsbereich 343, 1994 | 151 | 1994 |
K1 of Chevalley groups are nilpotent R Hazrat, N Vavilov Journal of Pure and Applied Algebra 179 (1-2), 99-116, 2003 | 148 | 2003 |
A third look at weight diagrams N Vavilov Rendiconti del Seminario Matematico della Università di Padova 104, 201-250, 2000 | 118 | 2000 |
Visual basic representations: an atlas E Plotkin, A Semenov, N Vavilov Int. J. Algebra Comput. 8 (1), 61-96, 1998 | 113 | 1998 |
Bak's work on the K-theory of rings R Hazrat, N Vavilov Journal of K-Theory 4 (1), 1-65, 2009 | 81 | 2009 |
Normality for elementary subgroup functors A Bak, N Vavilov Mathematical Proceedings of the Cambridge Philosophical Society 118 (1), 35-47, 1995 | 80 | 1995 |
On Grothendieck–Serre’s conjecture concerning principal-bundles over reductive group schemes: I I Panin, A Stavrova, N Vavilov Compositio Mathematica 151 (3), 535-567, 2015 | 77* | 2015 |
(2, 3)-generation of SL (n, q). I. Cases n= 5, 6, 7 D Martino, N Vavilov Communications In Algebra 22 (4), 1321-1347, 1994 | 74* | 1994 |
AN A3-PROOF OF STRUCTURE THEOREMS FOR CHEVALLEY GROUPS OF TYPES E6 AND E7 N Vavilov International Journal of Algebra and Computation 17 (05n06), 1283-1298, 2007 | 68* | 2007 |
Localization–completion strikes again: Relative K1 is nilpotent by abelian A Bak, R Hazrat, N Vavilov Journal of Pure and Applied Algebra 213 (6), 1075-1085, 2009 | 61 | 2009 |
Arrangement of subgroups in the general linear group over a commutative ring ZI Borevich, NA Vavilov Trudy Matematicheskogo Instituta imeni VA Steklova 165, 24-42, 1984 | 53 | 1984 |
Do It Yourself: the Structure Constants for Lie Algebras of Types E l NA Vavilov Journal of Mathematical Sciences 120, 1513-1548, 2004 | 52 | 2004 |
On the length of commutators in Chevalley groups A Stepanov, N Vavilov Israel Journal of Mathematics 185 (1), 253-276, 2011 | 50 | 2011 |
Subgroups of Chevalley groups that contain a maximal torus NA Vavilov Trudy Leningrad. Mat. Obshch. 1, 64-109, 1990 | 48 | 1990 |
Commutator width in Chevalley groups R Hazrat, A Stepanov, N Vavilov, Z Zhang arXiv preprint arXiv:1206.2128, 2012 | 47 | 2012 |
On the lattice of subgroups of Chevalley groups containing a split maximal torus A Harebov, N Vavilov Communications in Algebra 24 (1), 109-133, 1996 | 46 | 1996 |