Controlled K-theory and K-Homology

Abstract

Motivated by the idea that our access to the spacetime is limited by the resolution of our measuring device, we give a new description of K-homology with a finite resolution. G. Yu introduced a C*-algebra called the localization algebra C*L(X) which consists of functions from [1,∞) to the Roe algebra C*(X) whose propagations converge to 0 and he showed that for any finite dimensional simplicial complex X endowed with the spherical metric, the K-theory of the localization algebra is isomorphic to the K-homology of X. We give a coarse graining version of this theorem using controlled K-theory (also known as quantitative K-theory). Namely, instead of considering families of operators whose propagations converge to 0, we prove that for each dimension n, there exists a threshold rn>0 such that the K-homology of n-dimensional finite simplicial complex X is isomorphic to a certain group of equivalence classes of operators whose propagation is less than rn. This picture also enables us to represent any element in the K-homology group K*(X) by a finite matrix for a finite simplicial complex X.

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