Higher K-groups for operator systems
Abstract
We extend our previous definition of K-theoretic invariants for operator systems based on hermitian forms to higher K-theoretical invariants. We realize the need for a positive parameter δ as a measure for the spectral gap of the representatives for the K-theory classes. For each δ and integer p ≥ 0 this gives operator system invariants Vpδ(-,n), indexed by the corresponding matrix size. The corresponding direct system of these invariants has a direct limit that possesses a semigroup structure, and we define the Kpδ-groups as the corresponding Grothendieck groups. This is an invariant of unital operator systems, and, more generally, an invariant up to Morita equivalence of operator systems. Moreover, there is a formal periodicity that reduces all these groups to either K0δ or K1δ. We illustrate our invariants by means of the spectral localizer.
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