TL;DR
This paper reviews the topological and holonomic properties of a specific discrete-time quantum walk system, highlighting its unique boundary points and non-trivial topology, supported by theoretical calculations and preliminary experimental data.
Contribution
It introduces a quantum walk system with discrete topological boundaries and demonstrates its non-trivial topology through Zak phase calculations and experimental proposals.
Findings
Discrete Dirac points where the energy gap closes.
Non-trivial topology characterized by Zak phase.
Preliminary experimental data supporting theoretical ideas.
Abstract
We present a review on the progress in the understanding and characterization of holonomy and topology of a discrete-time quantum walk architecture, consisting of a unitary step given by a sequence of two non-commuting rotations in parameter space \cite{Puentesarxiv}. Unlike other similar systems recently studied in detail in the literature, this system does not present continous 1D topological boundaries, it only presents a discrete number of Dirac points where the quasi- energy gap closes. At these discrete points the topological winding number is not defined. Therefore, such discrete points represent topological boundaries of dimension zero, and they endow the system with a non-trivial topology. We illustrate the non-trivial character of the system by calculating the Zak phase. We also propose a suitable experimental scheme to implement these ideas, and we present preliminary…
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