The Witten Index for One-dimensional Non-unitary Quantum Walks with Gapless Time-evolution

Abstract

Recent developments in the index theory of discrete-time quantum walks allow us to assign a certain well-defined supersymmetric index to a pair of a unitary time-evolution U and a Z2-grading operator satisfying the chiral symmetry condition U* = U . In this paper, this index theory will be extended to encompass non-unitary U. The existing literature for unitary U makes use of the indispensable assumption that U is essentially gapped; that is, we require that the essential spectrum of U contains neither -1 nor +1 to define the associated index. It turns out that this assumption is no longer necessary, if the given time-evolution U is non-unitary. As a concrete example, we shall consider a well-known non-unitary quantum walk model on the one-dimensional integer lattice, introduced by Mochizuki-Kim-Obuse.