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

We systematically investigated perfect state transfer between antipodal nodes of discrete time quantum walks on variants of the cycles $C_4$, $C_6$ and $C_8$ for three choices of coin operator. Perfect state transfer was found, in general, to be very rare, only being preserved for a very small number of ways of modifying the cycles. We observed that some of our useful modifications of $C_4$ could be generalised to an arbitrary number of nodes, and present three families of graphs which admit quantum walks with interesting dynamics either in the continuous time walk, or in the discrete time walk for appropriate selections of coin and initial conditions. These dynamics are either periodicity, perfect state transfer, or very high fidelity state transfer. These families are modifications of families known not to exhibit periodicity or perfect state transfer in general. The robustness of the dynamics is tested by varying the initial state, interpolating between structures and by adding decoherence.

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Quantum state transfer on unsymmetrical graphs via discrete-time quantum walk

Modern Physics Letters A ◽

10.1142/s0217732319503176 ◽

2019 ◽

Vol 34 (38) ◽

pp. 1950317

Author(s):

Wei-Feng Cao ◽

Yu-Guang Yang ◽

Dan Li ◽

Jing-Ru Dong ◽

Yi-Hua Zhou ◽

...

Keyword(s):

Quantum State ◽

Discrete Time ◽

Complete Bipartite Graph ◽

Quantum Walk ◽

Star Graph ◽

Perfect State ◽

Quantum State Transfer ◽

State Transfer ◽

Butterfly Network ◽

Time Quantum

Perfect state transfer can be achieved between two marked vertices of graphs like a star graph, a complete graph with self-loops and a complete bipartite graph, and two-dimensional Lattice by means of discrete-time quantum walk. In this paper, we investigate the quality of quantum state transfer between two marked vertices of an unsymmetrical graph like the butterfly network. Our numerical results support the conjecture that the fidelity of state transfer depends on the quantum state to be transferred dynamically. The butterfly network is a typical example studied in networking coding. Therefore, these results can provide a clue to the construction of quantum network coding schemes.

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PERFECT STATE TRANSFER, GRAPH PRODUCTS AND EQUITABLE PARTITIONS

International Journal of Quantum Information ◽

10.1142/s0219749911007472 ◽

2011 ◽

Vol 09 (03) ◽

pp. 823-842 ◽

Cited By ~ 9

Author(s):

YANG GE ◽

BENJAMIN GREENBERG ◽

OSCAR PEREZ ◽

CHRISTINO TAMON

Keyword(s):

Continuous Time ◽

Quantum Walks ◽

Perfect State ◽

Graph Products ◽

State Transfer ◽

Time Quantum ◽

Perfect State Transfer

We describe new constructions of graphs which exhibit perfect state transfer on continuous-time quantum walks. Our constructions are based on generalizations of the double cones and variants of the Cartesian graph products (which include the hypercube). We also describe a generalization of the path collapsing argument (which reduces questions about perfect state transfer to simpler weighted multigraphs) for graphs with equitable distance partitions.

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Discrete-time quantum walk approach to state transfer

Physical Review A ◽

10.1103/physreva.83.062315 ◽

2011 ◽

Vol 83 (6) ◽

Cited By ~ 36

Author(s):

Paweł Kurzyński ◽

Antoni Wójcik

Keyword(s):

Discrete Time ◽

Quantum Walk ◽

State Transfer ◽

Time Quantum

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Perfect state transfer in Laplacian quantum walk

Journal of Algebraic Combinatorics ◽

10.1007/s10801-015-0642-x ◽

2015 ◽

Vol 43 (4) ◽

pp. 801-826 ◽

Cited By ~ 12

Author(s):

Rachael Alvir ◽

Sophia Dever ◽

Benjamin Lovitz ◽

James Myer ◽

Christino Tamon ◽

...

Keyword(s):

Quantum Walk ◽

Perfect State ◽

State Transfer ◽

Perfect State Transfer

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Perfect state transfer on quotient graphs

Quantum Information and Computation ◽

10.26421/qic12.3-4-9 ◽

2012 ◽

Vol 12 (3&4) ◽

pp. 293-313

Author(s):

Rachel Bachman ◽

Eric Fredette ◽

Jessica Fuller ◽

Michael Landry ◽

Michael Opperman ◽

...

Keyword(s):

Cartesian Product ◽

Quantum Walk ◽

Physical Review ◽

Quantum Walks ◽

Discrete Mathematics ◽

Perfect State ◽

Equitable Partition ◽

Quotient Graphs ◽

State Transfer ◽

Perfect State Transfer

We prove new results on perfect state transfer of quantum walks on quotient graphs. Since a graph G has perfect state transfer if and only if its quotient G/\pi, under any equitable partition \pi, has perfect state transfer, we exhibit graphs with perfect state transfer between two vertices but which lack automorphism swapping them. This answers a question of Godsil (Discrete Mathematics 312(1):129-147, 2011). We also show that the Cartesian product of quotient graphs \Box_{k} G_{k}/\pi_{k} is isomorphic to the quotient graph \Box_{k} G_{k}/\pi, for some equitable partition \pi. This provides an algebraic description of a construction due to Feder (Physical Review Letters 97, 180502, 2006) which is based on many-boson quantum walk.

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Perfect state transfer on signed graphs

Quantum Information and Computation ◽

10.26421/qic13.5-6-10 ◽

2013 ◽

Vol 13 (5&6) ◽

pp. 511-530

Author(s):

John Brown ◽

Chris Godsil ◽

Devlin Mallory ◽

Abigail Raz ◽

Christino Tamon

Keyword(s):

Regular Graph ◽

Complete Graph ◽

Quantum Walk ◽

Double Cover ◽

Quantum Walks ◽

Signed Graph ◽

Perfect State ◽

Signed Graphs ◽

State Transfer ◽

Perfect State Transfer

We study perfect state transfer of quantum walks on signed graphs. Our aim is to show that negative edges are useful for perfect state transfer. First, we show that the signed join of a negative $2$-clique with any positive $(n,3)$-regular graph has perfect state transfer even if the unsigned join does not. Curiously, the perfect state transfer time improves as $n$ increases. Next, we prove that a signed complete graph has perfect state transfer if its positive subgraph is a regular graph with perfect state transfer and its negative subgraph is periodic. This shows that signing is useful for creating perfect state transfer since no complete graph (except for the $2$-clique) has perfect state transfer. Also, we show that the double-cover of a signed graph has perfect state transfer if the positive subgraph has perfect state transfer and the negative subgraph is periodic.Here, signing is useful for constructing unsigned graphs with perfect state transfer. Finally, we study perfect state transfer on a family of signed graphs called the exterior powers which is derived from a many-fermion quantum walk on graphs.

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QUANTUM PERFECT STATE TRANSFER ON WEIGHTED JOIN GRAPHS

International Journal of Quantum Information ◽

10.1142/s0219749909006103 ◽

2009 ◽

Vol 07 (08) ◽

pp. 1429-1445 ◽

Cited By ~ 14

Author(s):

RICARDO JAVIER ANGELES-CANUL ◽

RACHAEL M. NORTON ◽

MICHAEL C. OPPERMAN ◽

CHRISTOPHER C. PARIBELLO ◽

MATTHEW C. RUSSELL ◽

...

Keyword(s):

Regular Graph ◽

Complete Graphs ◽

Perfect State ◽

Weighted Graphs ◽

Cartesian Products ◽

Hamming Graph ◽

State Transfer ◽

Vertex Graph ◽

Complete Bipartite Graphs ◽

Perfect State Transfer

This paper studies quantum perfect state transfer on weighted graphs. We prove that the join of a weighted two-vertex graph with any regular graph has perfect state transfer. This generalizes a result of Casaccino et al.1 where the regular graph is a complete graph with or without a missing edge. In contrast, we prove that the half-join of a weighted two-vertex graph with any weighted regular graph has no perfect state transfer. As a corollary, unlike for complete graphs, adding weights in complete bipartite graphs does not produce perfect state transfer. We also observe that any Hamming graph has perfect state transfer between each pair of its vertices. The result is a corollary of a closure property on weighted Cartesian products of perfect state transfer graphs. Moreover, on a hypercube, we show that perfect state transfer occurs between uniform superpositions on pairs of arbitrary subcubes, thus generalizing results of Bernasconi et al.2 and Moore and Russell.3

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