MATH 767 —
Spring 2000
Linear Algebraic Groups
| Instructor: |
Peter Abramenko |
| Time: |
MWF 11:15-12:05 |
| Room: |
MT 205 |
Linear groups are subgroups of GL_n(F) for some field F and some n.
Linear algebraic groups are those subgroups that are defined by polynomial
equations in the matrix entries and hence are endowed with the structure
of algebraic variety. A typical example is the special linear group SL_n(F),
which is defined by the single polynomial equation det(A) = 1. Other examples
are orthogonal and symplectic groups.
The course will give an introduction to the theory of linear algebraic
groups, presupposing only a standard first course in algebra at the graduate
level (groups, algebras, tensor products...). Important notions to be
discussed will be unipotent and semisimple elements, Jordan-Chevalley
decomposition, tori, connected solvable groups, the theorems of Lie and
Kolchin, parabolic subgroups, Lie algebras of linear algebraic groups,
reductive groups and their root systems.
The goal of the course will be a survey of the structure theory of reductive
groups over algebraically closed fields. (All examples mentioned in the
first paragraph are reductive.) In particular, we will see that these
groups always possess a BN-pair and hence give rise to a building. This
makes it possible to interpret some of the algebraic notions geometrically.
There will be some overlap here with the course on buildings given by
Ken Brown in Fall 1999 (which is not a prerequisite).
Last modified:
April 7, 2003
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