A new source of purely finite matricial fields
Abstract
A countable group G is said to be matricial field (MF) if it admits a strongly converging sequence of approximate homomorphisms into matrices; i.e, the norms of polynomials converge to those in the left regular representation. G is purely MF (PMF) if these maps are actual homomorphisms, and G is further purely finite field (PFF) if the image of each homomorphism is finite. By developing a new operator algebraic approach to these problems, we are able to prove the following result bringing several new examples into the fold. Suppose G is a MF (resp., PMF, PFF) group and H<G is separable (i.e., H=i∈ NHi where Hi<G are finite index subgroups) and K is a residually finite MF (resp., PMF, PFF) group. If either G or K is exact, then the amalgamated free product G*H(H× K) is MF (resp., PMF, PFF). Our work has several applications, we list some below: 1. The Brown--Douglas--Fillmore semigroups of many new examples of reduced group C*-algebras are shown to be not groups. 2. Arbitrary group doubles G*HG of MF (resp., PMF, PFF) over separable subgroups H are MF (resp., PMF, PFF). Moreover, G*H is PFF whenever G,H are PFF, and either G or H is exact. 3. Arbitrary graph products of residually finite exact MF (resp., PMF, PFF) groups are MF (resp., PMF, PFF), yielding a significant generalization of the breakthrough work of M. Magee and J. Thomas. 4. The open problem of proving PFF for fundamental groups of closed hyperbolic 3-manifolds is resolved. This has geometric significance in the theory of minimal surfaces via A. Song's approach.
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