Thermal states of anyonic systems

Abstract A study of the thermal properties of two-dimensional topological lattice models is presented. This work is relevant to assess the usefulness of these systems as a quantum memory. For our purposes, we use the topological mutual information I topo as a “topological order parameter”. For Abelian models, we show how I topo depends on the thermal topological charge probability distribution. More generally, we present a conjecture that I topo can (asymptotically) be written as a Kullback–Leitner distance between this probability distribution and that induced by the quantum dimensions of the model at hand. We also explain why I topo is more suitable for our purposes than the more familiar entanglement entropy S topo . A scaling law, encoding the interplay of volume and temperature effects, as well as different limit procedures, are derived in detail. A non-Abelian model is next analyzed and similar results are found. Finally, we also consider, in the case of a one-plaquette toric code, an environment model giving rise to a simulation of thermal effects in time.

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