English

Isomorphism conjectures with proper coefficients

K-Theory and Homology 2014-03-06 v3 Algebraic Topology Operator Algebras

Abstract

Let GG be a group and let EE be a functor from small Z\Z-linear categories to spectra. Also let AA be a ring with a GG-action. Under mild conditions on EE and AA one can define an equivariant homology theory of GG-simplicial sets HG(,E(A))H^G(-,E(A)) with the property that if HGH\subset G is a subgroup, then HG(G/H,E(A))=E(AH) H^G_*(G/H,E(A))=E_*(A\rtimes H) If now \cF\cF is a nonempty family of subgroups of GG, closed under conjugation and under subgroups, then there is a model category structure on GG-simplicial sets such that a map XYX\to Y is a weak equivalence (resp. a fibration) if and only if XHYHX^H\to Y^H is an equivalence (resp. a fibration) for all H\cFH\in\cF. The strong isomorphism conjecture for the quadruple (G,\cF,E,A)(G,\cF,E,A) asserts that if cXXcX\to X is the (G,\cF)(G,\cF)-cofibrant replacement then HG(cX,E(A))HG(X,E(A)) H^G(cX,E(A))\to H^G(X,E(A)) is an equivalence. The isomorphism conjecture says that this holds when XX is the one point space, in which case cXcX is the classifying space \cE(G,\cF)\cE(G,\cF). In this paper we introduce an algebraic notion of (G,\cF)(G,\cF)-properness for GG-rings, modelled on the analogous notion for GG-CC^*-algebras, and show that the strong (G,\cF,E,P)(G,\cF,E,P) isomorphism conjecture for (G,\cF)(G,\cF)-proper PP is true in several cases of interest in the algebraic KK-theory context. Thus we give a purely algebraic, discrete counterpart to a result of Guentner, Higson and Trout in the CC^*-algebraic case. We apply this to show that under rather general hypothesis, the assembly map HG(\cE(G,\cF),E(A))E(AG)H_*^G(\cE(G,\cF),E(A))\to E_*(A\rtimes G) can be identified with the boundary map in the long exact sequence of EE-groups associated to certain exact sequence of rings. Along the way we prove several results on excision in algebraic KK-theory and cyclic homology which are of independent interest.

Keywords

Cite

@article{arxiv.1108.5196,
  title  = {Isomorphism conjectures with proper coefficients},
  author = {Guillermo Cortiñas and Eugenia Ellis},
  journal= {arXiv preprint arXiv:1108.5196},
  year   = {2014}
}

Comments

55 pages. Minor changes

R2 v1 2026-06-21T18:55:22.840Z