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Snaith, Victor. A Descent Theorem for Hermitian K-Theory. Canadian journal of mathematics, Tome 39 (1987) no. 4, pp. 835-847. doi: 10.4153/CJM-1987-041-5
@article{10_4153_CJM_1987_041_5,
author = {Snaith, Victor},
title = {A {Descent} {Theorem} for {Hermitian} {K-Theory}},
journal = {Canadian journal of mathematics},
pages = {835--847},
year = {1987},
volume = {39},
number = {4},
doi = {10.4153/CJM-1987-041-5},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CJM-1987-041-5/}
}
[1] 1. Adams, J. F., Stable homotopy and generalised homology, Chicago Lecture Notes in Mathematics, (1974). Google Scholar
[2] 2. Anderson, D. W., The real K-theory of classifying spaces, Proc. Nat. Acad. Sci. 57 (1964), 634–636. Google Scholar
[3] 3. Atiyah, M. F., K-theory and reality, Quart. J. Math., Oxford (2), 17 (1966), 367–386. Google Scholar
[4] 4. Browder, W., Algebraic K-theory with coefficients Z/p, Springer Verlag Lecture Notes in Mathematics 654 (1978), 40–84. Google Scholar
[5] 5. Delzant, M. A., Definition des classes de Stiefel-Whitney d'un module quadratique sur un corps de charactéristique différente de 2, C.R. Acad. Sci., Paris 255 (1962), 1366–1368. Google Scholar
[6] 6. Gabber, O., Lecture at France — U.S.A. K-theory conference, Luminy (1983). Google Scholar
[7] 7. Gillet, H. and Thomason, R. W., The K-theory of strict Hensel local rings and a theorem of Suslin, JPAA 34 (1984), 241–251. Google Scholar
[8] 8. Grayson, D. (after D. G. Quillen), Higher algebraic K-theory II, Springer-Verlag Lecture Notes in Mathematics 551, 217–240. Google Scholar | DOI
[9] 9. Green, P. S., A cohomology theory based upon selfconjugacies of complex vector bundles. Bull. A.M. Soc. (1964), 522–524. Google Scholar
[10] 10. Jardine, J. F., Simplicial objects in a Grothendieck topos, preprint (1983). Google Scholar
[11] 11. Jardine, J. F., A rigidity theorem for L-theory, preprint (1983). Google Scholar
[12] 12. Karoubi, M., Théorie de Quillen et homologie du groupe orthogonal, Ann. Math. 112 (1980), 206–257. Google Scholar
[13] 13. Karoubi, M., Le théorème fondamental de la K-theorie hermitienne, Ann. Math. 112 (1980), 259–282. Google Scholar
[14] 14. Karoubi, M., Homology of the infinite orthogonal and symplectic groups over algebraically closed fields, Inventiones Math. 73 (1983), 247–250. Google Scholar
[15] 15. Karoubi, M., Relations between algebraic K-theory and Hermitian K-theory, preprint (1984). Google Scholar | DOI
[16] 16. Kahn, B., La deuxième classe de Stiefel-Whitney d'une représentation régulière, I & II, C.R. Acad. Sci., Paris 297 (1983), 313–316 and 573–576. Google Scholar
[17] 17. Kahn, B., Classes de Stiefel-Whitney de formes quadratiques et de représentations Galoisiennes reélles, Inventiones Math. 78 (1984), 223–256. Google Scholar
[18] 18. Milne, J. S., Étale cohomology, Princeton Math. Series 33 (1980). Google Scholar
[19] 19. Quillen, D. G., Higher algebraic K-theory I, Springer-Verlag Lecture Notes in Mathematics 341 (1973), 85–147. Google Scholar | DOI
[20] 20. Serre, J-P., Sur 1-invariant de Witt de la forme Tr(x2), Comm. Math. Helv. 59 (1984), 651–676. Google Scholar
[21] 21. Snaith, V. P., Algebraic cobordism and K-theory, Mem. A. M. Soc. 227 (1979). Google Scholar
[22] 22. Snaith, V. P., Localised stable homotopy and algebraic K-theory, Mem. A. M. Soc. 280 (1983). Google Scholar
[23] 23. Snaith, V. P., A brief survey of Bott periodic K-theory, Can. Math, Soc. Conf. Proc. 2, Part I (1982). Google Scholar
[24] 24. Snaith, V. P., Stiefel-Whitney classes of symmetric bilinear forms — a formula of Serre, Can. Bull. Math. 28 (1985), 218–222. Google Scholar
[25] 25. Snaith, V. P., Algebraic K-theory and bilinear forms, in preparation. Google Scholar
[26] 26. Snaith, V. P., K-theory of the classifying spaces of Galois groups, to appear Proc. Conf., St. John's, Newfoundland (1983) in A. M. Soc. Contemporary Math, series. Google Scholar
[27] 27. Suslin, A. A., On the K-theory of algebraically closed fields, Inventiones Math. 73 (1983), 241–245. Google Scholar
[28] 28. Suslin, A. A., On the K-theory of local fields, to appear J. Pure and Appl. Alg. Google Scholar | DOI
[29] 29. Thomason, R. W., Algebraic K-theory and étale cohomology, preprint. Google Scholar | DOI
[30] 30. Wagoner, J. B., Delooping the classifying spaces of algebraic K-theory, Topology 11 (1972), 349–370. Google Scholar
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