<span class='italic'>K</span>-theoretic Background

R. Sujatha

doi:10.1017/CBO9781316163757.003

2 - K-theoretic Background

Published online by Cambridge University Press: 05 March 2015

Edited by

Anupam Saikia and

R. Sujatha: Affiliation:
University of British Columbia, Vancouver, Canada
John Coates: Affiliation:
University of Cambridge
A. Raghuram: Affiliation:
Indian Institute of Science Education and Research, Pune
Anupam Saikia: Affiliation:
Indian Institute of Technology, Guwahati
R. Sujatha: Affiliation:
University of British Columbia, Vancouver

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Type: Chapter
Information: The Bloch–Kato Conjecture for the Riemann Zeta Function , pp. 22 - 44

DOI: https://doi.org/10.1017/CBO9781316163757.003 [Opens in a new window]

Publisher: Cambridge University Press

Print publication year: 2015

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References

[Ba68] Bass, H. 1968. Algebraic K-theory, W.A. Benjamin Inc., New York-Amsterdam.

[BK90] Bloch, S., and Kato, K. 1990. L-functions and Tamagawa numbers of motives, in The Grothendieck Festschrift, vol. 1. Progress in Math., 86, 333–400. Birkhäuser, Boston, MA.

[Bo77] Borel, A. 1977. Stable real cohomology of arithmetic groups. Ann. Sci. École Norm. Sup., 7, 613–636.Google Scholar

[Br78] Browder, W. 1978. Algebraic K-theory with coefficients ℤ/p, in “Geo-metric applications of Homotopy theory I”. Lecture Notes in Math., 657, 40–84. Berlin-Heidelberg-New York.

[Co15] Coates, J. 2015. Values of the Riemann zeta function at the odd positive integers and Iwasawa theory, in The Bloch-Kato Conjecture for the Riemann Zeta Function, LMS Lecture Note Series 418. Cambridge University Press. 45–64.

[DF85] Dwyer, W. G., and Friedlander, E. M. 1985. Algebraic and étale K-theory. Trans. AMS., 292, 247–280.Google Scholar

[Ge73] Gersten, S. M. 1973. Some exact sequences in the higher K-theory of rings, in Higher K-theories. Lecture Notes in Math., 341, 211–243.Google Scholar

[Gi81] Gillet, H. 1981. Riemann-Roch Theorems for Higher Algebraic K-theory. Advances in Math. 40, 203–281.Google Scholar

[Gr76] Grayson, D. 1976. Higher Algebraic K-theory II (After Daniel Quillen), in Algebraic K-theory (Proc. Conf. Northwestern Univ., Evanston III). Lecture Notes in Math., 551, 217–240.Google Scholar

[Gr58] Grothendieck, A. 1958. La théorie des classes de Chern. Bull. Soc. Math. France, 86, 137–154.Google Scholar

[Gr68] Grothendieck, A. 1968. Classes de Chern et répresentations lineaires des groupes discrets, (French), in Dix Exposés sur la Cohomologies des Schémas, North-Holland, Amsterdam; Masson, Paris, 215–305.

[Ka93] Kahn, B. 1993. On the Lichtenbaum-Quillen conjecture, Algebraic K-theory and algebraic topology (Lake Louise, AB, 1991). NATO Adv. Sci. Inst. Ser. C Math. Phys. Sci., 407, 147–166. Kluwer Acad Pub.,Dordrecht.

[Ko04] Kolster, M. 2004. K-theory and arithmetic. Contemporary developments in algebraic K-theory, ICTP Lecture Notes XV, Trieste, 191–258.

[Ko15] Kolster, M. 2015. The Norm residue homomorphism and the Quillen-Lichtenbaum conjecture, in The Bloch-Kato Conjecture for the Riemann Zeta Function, LMS Lecture Note Series 418. Cambridge University Press. 97–120.

[Li15] Lichtenbaum, S. 2015. Soule's theorem, in The Bloch-Kato Conjecture for the Riemann Zeta Function, LMS Lecture Note Series 418. Cambridge University Press. 130–139.

[Lo76] Loday, J.-L. 1976. K-théorie et représentations de groupes. Ann. Scient. Éc. Norm. Sup., 4 iéme série, 9, 309–377.Google Scholar

[Mi80] Milne, J. S. 1980. Etale cohomology. Princeton Math. Series, 33, Princeton University Press, Princeton, New Jersey.

[Ng15] Nguyen Quang Do, T. 2015. On the determinantal approach to the Tamagawa Number Conjecture, in The Bloch-Kato Conjecture for the Riemann Zeta Function, LMS Lecture Note Series 418. Cambridge University Press. 154–193.

[Q71] Quillen, D. 1971. Cohomology of Groups. ICM Proceedings, Nice 1970, Gauthier Villars, Vol. II, 47–51.Google Scholar

[Q73a] Quillen, D. 1973. Higher Algebraic K-theory I, in Higher K-theories, Proc. Conf. Battelle Memorial Inst., Seattle, Was., (1972), Lecture Notes in Math., 341, 85–147. Springer-Verlag, Berlin-New York.

[Q73b] Quillen, D. 1973. Finite generation of the groups Ki of rings of algebraic integers, in Higher K-theories. Proc. Conf. Battelle Memorial Inst., Seattle, Was. (1972), Lecture Notes in Math., 341, 179–198, Springer-Verlag, Berlin-New York.

[Ra15] Raghuram, A. 2015. Special values of the Riemann zeta function: some results and conjectures, in The Bloch-Kato Conjecture for the Riemann Zeta Function, LMS Lecture Note Series 418. Cambridge University Press. 1–21.

[Sel97] Selick, P. 1997. Introduction to Homotopy theory. Field Institute Monographs, 9, American Mathematical Society, Providence, RI.

[So79] Soule, C. 1979. K-théorie des anneaux d'entiers de corps de nombres et cohomogie étale. Invent. Math., 55, 251–295.Google Scholar

[Sr93] Srinivas, V. 1993 Algberaic K-theory, 2nd. Ed. Progress in Math. vol. 90, Birkhäuser.

[Sw68] Swan, R. G. 1968. Algebraic K-theory. Lecture Notes in Math., 76, Springer-Verlag, Berlin-New York.Google Scholar

[Wa78] Waldhausen, F. 1978. Algebraic K-theory of generalized free products I, II. Ann. of Math., (2), 108, no.2, 135–204, 205–256.Google Scholar

[We13] Weibel, C. 2013. The K-book: An introduction to Algebraic K-theory. Graduate Studies in Math., 145, AMS.Google Scholar

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