Kleinerman, Samuel N., 1949-
The cohomology of Chevalley groups of exceptional Lie type / [electronic resource] Samuel N. Kleinerman. - Providence, R.I., USA : American Mathematical Society, c1982. - 1 online resource (viii, 82 p.) - Memoirs of the American Mathematical Society, v. 268 0065-9266 (print); 1947-6221 (online); .
"September 1982, volume 39." Originally presented as the author's Ph.D. thesis.
Bibliography: p. 82.
1. Main results 2. The construction of $\textrm (\mathbb _q)$ from $\textrm $ 3. The 2nd quadrant Eilenberg-Moore spectral sequence 4. The cohomology of $\textrm (\mathbb _q)$ away from the torsion of $G$ 5. The $l$-primary cohomology of $\textrm (\mathbb _q)$ away from the torsion of $G$ 6. The $\mathbb /2$-cohomology of $\textrm _2(\mathbb _q)$ and $\textrm �_4(\mathbb _q)$ and the 2-primary cohomology of $\textrm _2(\mathbb _q)$ 7. The $\mathbb /2$-cohomology of $\textrm _5(\mathbb _q)$ 8. The $\mathbb /2$-cohomology of $\textrm �_6(\mathbb _q)$ 9. An application to homotopy theory
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470406752 (online)
Chevalley groups.
Lie groups.
Homology theory.
QA3 QA171 / .A57 no. 268
510 s 512/.55
The cohomology of Chevalley groups of exceptional Lie type / [electronic resource] Samuel N. Kleinerman. - Providence, R.I., USA : American Mathematical Society, c1982. - 1 online resource (viii, 82 p.) - Memoirs of the American Mathematical Society, v. 268 0065-9266 (print); 1947-6221 (online); .
"September 1982, volume 39." Originally presented as the author's Ph.D. thesis.
Bibliography: p. 82.
1. Main results 2. The construction of $\textrm (\mathbb _q)$ from $\textrm $ 3. The 2nd quadrant Eilenberg-Moore spectral sequence 4. The cohomology of $\textrm (\mathbb _q)$ away from the torsion of $G$ 5. The $l$-primary cohomology of $\textrm (\mathbb _q)$ away from the torsion of $G$ 6. The $\mathbb /2$-cohomology of $\textrm _2(\mathbb _q)$ and $\textrm �_4(\mathbb _q)$ and the 2-primary cohomology of $\textrm _2(\mathbb _q)$ 7. The $\mathbb /2$-cohomology of $\textrm _5(\mathbb _q)$ 8. The $\mathbb /2$-cohomology of $\textrm �_6(\mathbb _q)$ 9. An application to homotopy theory
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470406752 (online)
Chevalley groups.
Lie groups.
Homology theory.
QA3 QA171 / .A57 no. 268
510 s 512/.55