Quantum walks in external gauge fields

C. Cedzich; T. Geib; A. H. Werner; R. F. Werner

doi:10.1063/1.5054894

Quantum walks in external gauge fields

C. Cedzich, T. Geib, A. H. Werner, R. F. Werner

10 Citations (Scopus)

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Abstract

Describing a particle in an external electromagnetic field is a basic task of quantum mechanics. The standard scheme for this is known as "minimal coupling" and consists of replacing the momentum operators in the Hamiltonian by the modified ones with an added vector potential. In lattice systems, it is not so clear how to do this because there is no continuous translation symmetry, and hence, there are no momenta. Moreover, when time is also discrete, as in quantum walk systems, there is no Hamiltonian, but only a unitary step operator. We present a unified framework of gauge theory for such discrete systems, keeping a close analogy to the continuum case. In particular, we show how to implement minimal coupling in a way that automatically guarantees unitary dynamics. The scheme works in any lattice dimension, for any number of internal degrees of freedom, for walks that allow jumps to a finite neighbourhood rather than to nearest neighbours, is naturally gauge invariant, and prepares possible extensions to non-abelian gauge groups.

Original language	English
Article number	012107
Journal	Journal of Mathematical Physics
Volume	60
Issue number	1
Number of pages	18
ISSN	0022-2488
DOIs	https://doi.org/10.1063/1.5054894
Publication status	Published - 2019

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Quantum walks in external gauge fields

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