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Algebraic K-Groups as Galois Modules
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Catalogue Information
Field name
Details
Dewey Class
512.7
Title
Algebraic K-Groups as Galois Modules ([EBook] /) / by Victor P. Snaith.
Author
Snaith, Victor P.
Other name(s)
SpringerLink (Online service)
Publication
Basel : : Birkhäuser Basel : : Imprint: Birkhäuser, , 2002.
Physical Details
X, 309 p. : online resource.
Series
Progress in mathematics
0743-1643 ; ; 206
ISBN
9783034882071
Summary Note
This volume began as the last part of a one-term graduate course given at the Fields Institute for Research in the Mathematical Sciences in the Autumn of 1993. The course was one of four associated with the 1993-94 Fields Institute programme, which I helped to organise, entitled "Artin L-functions". Published as [132]' the final chapter of the course introduced a manner in which to construct class-group valued invariants from Galois actions on the algebraic K-groups, in dimensions two and three, of number rings. These invariants were inspired by the analogous Chin burg invariants of [34], which correspond to dimensions zero and one. The classical Chinburg invariants measure the Galois structure of classical objects such as units in rings of algebraic integers. However, at the "Galois Module Structure" workshop in February 1994, discussions about my invariant (0,1 (L/ K, 3) in the notation of Chapter 5) after my lecture revealed that a number of other higher-dimensional co homological and motivic invariants of a similar nature were beginning to surface in the work of several authors. Encouraged by this trend and convinced that K-theory is the archetypical motivic cohomology theory, I gratefully took the opportunity of collaboration on computing and generalizing these K-theoretic invariants. These generalizations took several forms - local and global, for example - as I followed part of number theory and the prevalent trends in the "Galois Module Structure" arithmetic geometry.:
Contents note
1 Galois Actions and L-values -- 1.1 Analytic prerequisites -- 1.2 The Lichtenbaum conjecture -- 1.3 Examples of Galois structure invariants -- 2 K-groups and Class-groups -- 2.1 Low-dimensional algebraic K-theory -- 2.2 Perfect complexes -- 2.3 Nearly perfect complexes -- 2.4 Higher-dimensional algebraic K-theory -- 2.5 Describing the class-group by representations -- 3 Higher K-theory of Local Fields -- 3.1 Local fundamental classes and K-groups -- 3.2 The higher K-theory invariants ?s(L/K,2) -- 3.3 Two-dimensional thoughts -- 4 Positive Characteristic -- 4.1 ?1(L/K,2) in the tame case -- 4.2 $$ Ext_{Z[G(L/K)]} 2(F_{{v d}} *,F_{{v {2d}}} *) $$ -- 4.3 Connections with motivic complexes -- 5 Higher K-theory of Algebraic Integers -- 5.1 Positive étale cohomology -- 5.2 The invariant ?n(N/K,3) -- 5.3 A closer look at ?1(L/K,3) -- 5.4 Comparing the two definitions -- 5.5 Some calculations -- 5.6 Lifted Galois invariants -- 6 The Wiles unit -- 6.1 The Iwasawa polynomial -- 6.2 p-adic L-functions -- 6.3 Determinants and the Wiles unit -- 6.4 Modular forms with coefficients in ?[G] -- 7 Annihilators -- 7.1K0(Z[G], Q) and annihilator relations -- 7.2 Conjectures of Brumer, Coates and Sinnott -- 7.3 The radical of the Stickelberger ideal.
System details note
Online access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users)
Internet Site
http://dx.doi.org/10.1007/978-3-0348-8207-1
Links to Related Works
Subject References:
Algebraic Geometry
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Mathematics
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Number Theory
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Authors:
Snaith, Victor P.
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Corporate Authors:
SpringerLink (Online service)
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Series:
Progress in mathematics
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Classification:
512.7
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512.7 (DDC 22)
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