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On the Bott index of unitary matrices on a finite torus

Daniele Toniolo

2022Letters in Mathematical Physics32 citationsDOIOpen Access PDF

Abstract

Abstract This article reviews the foundations of the theory of the Bott index of a pair of unitary matrices in the context of condensed matter theory, as developed by Hastings and Loring (J. Math. Phys. 51 , 015214 (2010), Ann. Phys. 326 , 1699 (2011)), providing a novel proof of the equality with the Chern number. The Bott index is defined for a pair of unitary matrices, then extended to a pair of invertible matrices and homotopic invariance of the index is proven. An insulator defined on a lattice on a two-torus, that is a rectangular lattice with periodic boundary conditions, is considered and a pair of quasi-unitary matrices associated to this physical system are introduced. It is shown that their Bott index is well defined and the connection with the transverse conductance, the Chern number, is established proving the equality of the two quantities, in certain units.

Topics & Concepts

Unitary stateMathematicsInvertible matrixUnitary matrixPure mathematicsTorusConnection (principal bundle)Lattice (music)Toda latticeChern classMathematical physicsPhysicsGeometryIntegrable systemPolitical scienceAcousticsLawQuantum many-body systemsQuantum and electron transport phenomenaTopological Materials and Phenomena
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