English

Scale Structures and C*-algebras

Metric Geometry 2016-02-25 v1 General Topology Operator Algebras

Abstract

The purpose of this paper is to investigate the duality between large scale and small scale. It is done by creating a connection between C*-algebras and scale structures. In the commutative case we consider C*-subalgebras of Cb(X)C^b(X), the C*-algebra of bounded complex-valued functions on XX. Namely, each C*-subalgebra C\mathscr{C} of Cb(X)C^b(X) induces both a small scale structure on XX and a large scale structure on XX. The small scale structure induced on XX corresponds (or is analogous) to the restriction of Cb(h(X))C^b(h(X)) to XX, where h(X)h(X) is the Higson compactification. The large scale structure induced on XX is a generalization of the C0C_0-coarse structure of N.Wright. Conversely, each small scale structure on XX induces a C*-subalgebra of Cb(X)C^b(X) and each large scale structure on XX induces a C*-subalgebra of Cb(X)C^b(X). To accomplish the full correspondence between scale structures on XX and C*-subalgebras of Cb(X)C^b(X) we need to enhance the scale structures to what we call hybrid structures. In the noncommutative case we consider C*-subalgebras of bounded operators B(l2(X))B(l_2(X)).

Keywords

Cite

@article{arxiv.1602.07301,
  title  = {Scale Structures and C*-algebras},
  author = {Kyle Austin and Jerzy Dydak and Michael Holloway},
  journal= {arXiv preprint arXiv:1602.07301},
  year   = {2016}
}

Comments

17 pages

R2 v1 2026-06-22T12:56:20.686Z