S. Skoupý scite author profile

Perfect state transfer between two marked vertices of a graph by means of discrete-time quantum walk is analyzed. We consider the quantum walk search algorithm with two marked vertices, sender and receiver. It is shown by explicit calculation that for the coined quantum walks on star graph and complete graph with self-loops perfect state transfer between the sender and receiver vertex is achieved for arbitrary number of vertices N in O( √ N ) steps of the walk. Finally, we show that Szegedy's walk with queries on complete graph allows for state transfer with unit fidelity in the limit of large N .

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Perfect state transfer by means of discrete-time quantum walk on complete bipartite graphs

źTefaźák

Skoupý

2017

Quantum Inf Process

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We consider a quantum walk with two marked vertices, sender and receiver, and analyze its application to perfect state transfer on complete bipartite graphs. First, the situation with both the sender and the receiver vertex in the same part of the graph is considered. We show that in this case the dynamics of the quantum walk is independent of the size of the second part and reduces to the one for the star graph where perfect state transfer is achieved. Second, we consider the situation where the sender and the receiver vertex are in the opposite parts of the graph. In such a case the state transfer with unit fidelity is achieved only when the parts have the same size.

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Quantum-walk-based state-transfer algorithms on the complete M -partite graph

Skoupý

Štefaňák

2021

Phys. Rev. A

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S. Skoupý

Perfect state transfer by means of discrete-time quantum walk search algorithms on highly symmetric graphs

Perfect state transfer by means of discrete-time quantum walk on complete bipartite graphs

Quantum-walk-based state-transfer algorithms on the complete M -partite graph

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