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 Date: 2012-10-06 16:49:22Homological algebra Spectral sequences Group theory Homology theory Serre spectral sequence Steenrod algebra Eilenberg–Moore spectral sequence Cohomology Universal coefficient theorem Abstract algebra Algebra Algebraic topology |
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THE COHOMOLOGY OF LIE GROUPS JUN HOU FUNG Abstract. We follow the computations in [2], [5], and [8] to deduce the cohomology rings of various Lie groups (SU (n), U (n), Sp(n) with Z-coefficients and SO(n), Spin(n), G2 , 
![Homology and Cohomology Theory 14Fxx [1] Timothy G. Abbott, Kiran S. Kedlaya, and David Roe, Bounding Picard numbers of surfaces using p-adic cohomology, Martin Bright, Brauer groups of diagonal quartic surface](https://www.pdfsearch.io/img/1a1c36e1fcd474964a2e5941a9d2b503.jpg "Homology and Cohomology Theory 14Fxx [1] Timothy G. Abbott, Kiran S. Kedlaya, and David Roe, Bounding Picard numbers of surfaces using p-adic cohomology, Martin Bright, Brauer groups of diagonal quartic surface")
![MODULE AND FILTERED KNOT HOMOLOGY THEORIES JEFF HICKS Abstract. We provide a new way to define Bar-Natan’s F2 [u] knot homology theory. The u torsion of BN •,• is shown to explicitly give Turner’s spectral sequen](https://www.pdfsearch.io/img/7a5cf9c6c980f247a689bfb1d8879467.jpg "MODULE AND FILTERED KNOT HOMOLOGY THEORIES JEFF HICKS Abstract. We provide a new way to define Bar-Natan’s F2 [u] knot homology theory. The u torsion of BN •,• is shown to explicitly give Turner’s spectral sequen")
