Algebraic K-Theory: Connections with Geometry and Topology

Abstract

Contents: Barry Dayton and Charles Weibel, On the naturality of Pic,SK0 and SK1 (pp. 1–28); Henri Gillet and Christophe Soulé, Arithmetic Chow groups and differential characters (pp. 29–68); Bruno Harris, Differential characters and the Abel-Jacobi map (pp. 69–86); Jürgen Hurrelbrink, Class numbers, units and K2 (pp. 87–102); J. F. Jardine, Steenrod operations in the cohomology of simplicial presheaves (pp. 103–116); Bruno Kahn, Some conjectures on the algebraic K-theory of fields. I. K-theory with coefficients and étale K-theory (pp. 117–176); Manfred Kolster, Odd torsion in the tame kernel of totally real number fields (pp. 177–188); Reinhard C. Laubenbacher, On the K-theory of ZG,G a group of square-free order (pp. 189–208); J.-L. Loday and C. Procesi, Cyclic homology and lambda operations (pp. 209–224); Ieke Moerdijk, Bisimplicial sets and the group-completion theorem (pp. 225–240); Ye. A. Nisnevich, The completely decomposed topology on schemes and associated descent spectral sequences in algebraic K-theory (pp. 241–342); Wayne Raskind, Torsion algebraic cycles on varieties over local fields (pp. 343–388); Leslie G. Roberts, Kähler differentials and HC1 of certain graded K-algebras (pp. 389–424); Shuji Saito, A global duality theorem for varieties over global fields (pp. 425–444); Victor Snaith, Invariants of representations (pp. 445–508); Wilberd van der Kallen, Presenting K2 with generic symbols (pp. 509–516); The Lake Louise problem session (pp. 517–550). {The papers are being reviewed individually.}\