Description: Lecture, three hours; discussion, one hour. Basic concepts of homotopy theory, fundamental group and covering spaces, singular homology and cohomology theory, axions of homology theory, Mayer/Vietoris sequence, calculation of homology and cohomology of standard spaces, cell complexes and cellular homology, de Rham theorem on isomorphism of de Rham differential-form cohomology and singular cohomology with real coefficients. S/U or letter grading.
Bruinwalk is an entirely Daily Bruin-run service brought to you for free. We hate
annoying ads just as much as you do,
but they help keep our lights on. We promise to keep our ads as relevant for you as possible, so
please consider disabling your ad-blocking
software while using this site.