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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.

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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.

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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.

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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.

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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.

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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.

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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.