English

A trace map on higher scissors congruence groups

K-Theory and Homology 2023-09-15 v2 Algebraic Topology

Abstract

Cut-and-paste KK-theory has recently emerged as an important variant of higher algebraic KK-theory. However, many of the powerful tools used to study classical higher algebraic KK-theory do not yet have analogues in the cut-and-paste setting. In particular, there does not yet exist a sensible notion of the Dennis trace for cut-and-paste KK-theory. In this paper we address the particular case of the KK-theory of polyhedra, also called scissors congruence KK-theory. We introduce an explicit, computable trace map from the higher scissors congruence groups to group homology, and use this trace to prove the existence of some nonzero classes in the higher scissors congruence groups. We also show that the KK-theory of polyhedra is a homotopy orbit spectrum. This fits into Thomason's general framework of KK-theory commuting with homotopy colimits, but we give a self-contained proof. We then use this result to re-interpret the trace map as a partial inverse to the map that commutes homotopy orbits with algebraic KK-theory.

Keywords

Cite

@article{arxiv.2303.08172,
  title  = {A trace map on higher scissors congruence groups},
  author = {Anna Marie Bohmann and Teena Gerhardt and Cary Malkiewich and Mona Merling and Inna Zakharevich},
  journal= {arXiv preprint arXiv:2303.08172},
  year   = {2023}
}

Comments

32 pages, 3 figures. Revision of the paper previously entitled "A Farrell--Jones isomorphism for $K$-theory of polyhedra."

R2 v1 2026-06-28T09:17:17.196Z