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MAT 552 Course Webpage
Introduction to Lie groups and Lie algebras
M W 2:30PM 3:50PM, Physics P 127
Spring 2024
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Course Announcements
Announcements about the course will be posted here. Please check the
site regularly for announcements (which will also be given in lecture
and/or in recitation).
- Here is
a link
to an article of Borel computing the rational cohomology of the
generalized flag variety of a simply connected, compact real Lie
group (equivalently, a connected, semisimple complex Lie group).
When combined with Hopf's theorem, this provides the link between
the generators of the rational cohomology algebra of the Lie group
and the "fundamental invariants" in the Harish-Chandra isomorphism.
- Our textbook does not include a complete proof of the
Baker-Campbell-Hausdorff Formula. There is a collection of many
different proofs in this
article
by Michael Müger.
- Prof. Abanov (SCGP) has an online list of the most commonly used homotopy groups of Lie
groups and homogeneous manifolds.
- Pierre Cartier wrote a primer on Hopf
algebras that includes a wonderful history of the topological
study of Lie groups.
- Prof. Helgason (MIT) has made available several of his
fantastic articles on the history of Lie groups under "Additional
Readings" on his OCW website.
- Regarding the
cohomology of Lie groups and their flag manifolds, students might
find the following MathOverflow question interesting (Borel's Theorem for other
coefficient rings than Q). In particular, the article by
Demazure linked in that post settles the question.
Course Description
Description in the graduate bulletin.
"An introduction to Lie groups and Lie algebras, as used in
mathematics and physics. Basic facts about Lie groups and Lie
algebras; classical groups. Structure theory of Lie
algebras. Representation theory of sl (2,C). Classification of
complex semisimple Lie algebras via their root systems. Examples of
exceptional Lie algebras. Other possible topics include the
representation theory compact Lie groups and semisimple Lie algebras
(with a focus on analytic techniques)."
A Lie group is a differentiable manifold with a smooth group
structure, and the induced
structure on the tangent space of the manifold at the group
identity is a Lie algebra.
Lie groups arise as symmetry groups in many other
mathematical subjects, which makes them central objects of study.
This course studies Lie groups as important examples of
differentiable manifolds, but we also explore the structure theory
and classification of Lie groups and Lie algebras.
Prerequisites
Students should have passed the graduate algebra sequence or its equivalent and
understand the basics of differentiable manifolds.
Text
There is no required textbook. The recommended textbook is
An introduction to Lie groups and Lie algebras by
Prof. Alexander Kirillov, Jr. For the theory of finite-dimensional
complex linear representations of complex semisimple Lie algebras,
I also recommend
Representation theory, a first course. by William
Fulton and Joe Harris. For the algebraic side, there are excellent
books by Springer, by Humphreys, by Borel, and by Bourbaki. At a
deeper level, there is SGA 3 and the textbook of
Lectures
The instructor for this course is
Jason Starr.
All instruction will occur in lectures. The tentative schedule is
in the syllabus.
Lecture is held Mondays and Wednesdays, 2:30 PM 3:50 PM in
Physics P 127.
Office
Hours. Here is a link to the
current office hours.
Grading System
Grades are based on class participation, on performance on assigned
problem sets, and on a final 20-minute oral presentation on a topic
related to the course and approved by the instructor. This will be
discussed further in the first week of lecture.
If you have a physical, psychological, medical, or learning disability
that may impact your course work, please contact the Student
Accessibility Support Center, Stony Brook Union Suite 107, (631)
632-6748, or
at sasc@stonybrook.edu.
They will determine with you what
accommodations are necessary and appropriate. All information and
documentation is confidential.
Students who require assistance during emergency evacuation are
encouraged to discuss their needs with their professors and the
Student Accessibility Support Center. For procedures and information
go to the following website:
https://ehs.stonybrook.edu//programs/fire-safety/emergency-evacuation/evacuation-guide-disabilities
and search Fire Safety and Evacuation and Disabilities.
Each student must pursue his or her academic goals honestly and be
personally accountable for all submitted work. Representing another
person's work as your own is always wrong. Faculty is required to
report any suspected instances of academic dishonesty to the Academic
Judiciary.
For more comprehensive information on academic integrity,
including categories of academic dishonesty please refer to the
academic judiciary website at
http://www.stonybrook.edu/commcms/academic_integrity/index.html
Stony Brook University expects students to respect the rights,
privileges, and property of other people. Faculty are required to
report to the Office of Judicial Affairs any
disruptive behavior that interrupts their ability to teach,
compromises the safety of the learning environment, or inhibits
students' ability to learn.
Further information about most academic matters can be found in the
Undergraduate Bulletin, the Undergraduate Class Schedule, and the
Faculty-Employee Handbook.
Back to my home page.
Jason Starr
4-108 Math Tower
Department of Mathematics
Stony Brook University
Stony Brook, NY 11794-3651
Phone: 631-632-8270
Fax: 631-632-7631
Jason Starr