Entanglement and particle fluctuations of one-dimensional chiral topological insulators

Abstract

We consider the topological protection of entanglement and particle fluctuations for a general one-dimensional chiral topological insulator with winding number I. We prove, in particular, that when the periodic system is divided spatially into two equal halves, the single-particle entanglement spectrum has 2|I| protected eigenvalues at 1/2. Therefore the number fluctuations are bounded from below by N2≥ |I|/2 and the entanglement entropy by S≥ 2|I| 2. We note that our results are obtained by applying directly an index theorem to the microscopic model and do not rely on an equivalence to a continuum model or a bulk-boundary correspondence for a slow varying boundary.

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