Asimptotic dimension and Novikov-Shubin invariants for open manifolds

Abstract

A trace on the C*-algebra A of quasi-local operators on an open manifold is described, based on the results in RoeOpen. It allows a description `a la Novikov-Shubin NS2 of the low frequency behavior of the Laplace-Beltrami operator. The 0-th Novikov-Shubin invariant defined in terms of such a trace is proved to coincide with a metric invariant, which we call asymptotic dimension, thus giving a large scale ``Weyl asymptotics'' relation. Moreover, in analogy with the Connes-Wodzicki result CoCMP,Co,Wo, the asymptotic dimension d measures the singular traceability (at 0) of the Laplace-Beltrami operator, namely we may construct a (type II1) singular trace which is finite on the *-bimodule over A generated by -d/2.