Algebraic K-Theory and Modular Symbols

Abstract

In this paper, we calculate the differential d1 of the rank spectral sequence. We generalize Quillen's spectral sequence from Dedekind domain to general integral Noetherian ring A by considering the Q-construction Qtf(A) of the category of finitely generated torsion-free modules. In particular, by resolution theorem, if A is regular, then Qtf(A) is homotopy equivalent to QP(A) where P(A) is the category of finitely generated projective A-modules. We deduce the differential d1 by using Tits buildings, Steinberg modules, and modular symbols in the sense of Ash-Rudolph. The spirit of Quillen's categorical homotopy theory will be used intensively throughout this paper.