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MATH 231BR Spring 2017-2018 / Section: 001 / Class number: 12883

Advanced Algebraic Topology
Science Ctr 411 (FAS)
Tuesday 10:00 AM - 11:29 AM; Thursday 10:00 AM - 11:29 AM

Course website

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

MATH 231BR Spring 2016-2017 / Section: 001 / Class number: 11254

Advanced Algebraic Topology
Science Ctr 221 (FAS)
Friday 14:00-14:59; Wednesday 14:00-14:59; Monday 14:00-14:59

Course website Warning! This Canvas course has been concluded. Only prior members of the course can access the site.

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

MATH 231BR Spring 2015-2016 / Section: 001 / Class number: 12846

Advanced Algebraic Topology
Monday, Wednesday, Friday 2:00pm - 2:59pm

Course website Warning! This Canvas course has been concluded. Only prior members of the course can access the site.

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

Mathematics 231br Spring 2014-2015

Advanced Algebraic Topology
Michael J. Hopkins
Science Center 507
M., W., F., at 2

Course website (Canvas) Warning! This Canvas course has been concluded. Only prior members of the course can access the site.

Course website (iSite)

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

Mathematics 231br Spring 2013-2014

Advanced Algebraic Topology
Gereon Quick
Monday, Wednesday, Friday 2:30pm - 3:30pm

Course website

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

Mathematics 231br Spring 2012-2013

Advanced Algebraic Topology
Kirsten Graham Wickelgren
Monday, Wednesday, Friday 2:00pm - 3:00pm

Course website

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

Mathematics 231br Spring 2011-2012

Advanced Algebraic Topology
Peter B. Kronheimer
Monday, Wednesday, Friday 2:00pm - 3:00pm

Course website

Continuation of Mathematics 231a. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.

Mathematics 231br Spring 2010-2011

Advanced Algebraic Topology
Michael J. Hopkins
Science Center 507
M., W., F., at 2

Course website

Continuation of Mathematics 231a. Spectral sequences and techniques of computation. Vector bundles and characteristic classes. Bott periodicity. K-theory, cobordism and stable cohomotopy as examples of cohomology theories.