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Algebraic $K$-Theory and Algebraic Number Theory
About this Title
Michael R. Stein and R. Keith Dennis, Editors
Publication: Contemporary Mathematics
Publication Year:
1989; Volume 83
ISBNs: 978-0-8218-5090-9 (print); 978-0-8218-7671-8 (online)
DOI: https://doi.org/10.1090/conm/083
MathSciNet review: 991972
Table of Contents
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Front/Back Matter
Articles
- Eiichi Abe – Normal subgroups of Chevalley groups over commutative rings [MR 991973]
- Spencer Bloch – Cycles and biextensions [MR 991974]
- Daniel R. Grayson – On the $K$-theory of fields [MR 991975]
- J. F. Jardine – The homotopical foundations of algebraic $K$-theory [MR 991976]
- J. F. Jardine – Universal Hasse-Witt classes [MR 991977]
- Kazuya Kato – Swan conductors for characters of degree one in the imperfect residue field case [MR 991978]
- Nobushige Kurokawa – Special values of Selberg zeta functions [MR 991979]
- Stephen Lichtenbaum – Groups related to scissors-congruence groups [MR 991980]
- Takayuki Oda – Abelian $l$-adic representations associated with Selberg integrals [MR 991981]
- Dinakar Ramakrishnan – Regulators, algebraic cycles, and values of $L$-functions [MR 991982]
- Wayne Raskind – Algebraic $K$-theory, étale cohomology and torsion algebraic cycles [MR 991983]
- Clayton Sherman – On the homotopy fiber of the map $BQ\scr A^\oplus \to BQ\scr A$ (after M. Auslander) [MR 991984]
- Christophe Soulé – Connexions et classes caractéristiques de Beilinson [MR 991985]
- Haruo Suzuki – A note in $K$-theory of some $C^*$-algebras [MR 991986]
- R. W. Thomason – A finiteness condition equivalent to the Tate conjecture over $\mathbf {F}_q$ [MR 991987]
- R. W. Thomason – Survey of algebraic vs. étale topological $K$-theory [MR 991988]
- L. N. Vaserstein – Noncommutative number theory [MR 991989]
- L. N. Vaserstein – Normal subgroups of classical groups over rings and gauge groups [MR 991990]
- Charles A. Weibel – Homotopy algebraic $K$-theory [MR 991991]