A scheme for topological phases of the Weyl C*-algebra
Abstract
In this work, we introduce a classification scheme for topological phases of matter based on the topology of the space of pure states of a model C*-algebra. Under it, topological phases are described by homotopy classes of sections of certain fiber bundles of (pure) states. Applying this classification procedure on states of the Weyl C*-algebra that are invariant under translations by a lattice, we recover the K-theoretic classification of gapped spectral projectors for topological insulators of types A and AI, thus essentially generalizing this notion.
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