Understanding domain-wall encoding theoretically and experimentally

Berwald, Jesse; Chancellor, Nicholas; Dridi, Raouf

doi:10.1098/rsta.2021.0410

Cited by 19 publications

(15 citation statements)

References 52 publications

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“…Importantly, arbitrary pairwise interactions between discrete variables can be mapped to quadratic interactions between qubits. It is suitable for devices with limited connectivity (Chancellor, 2019) and uses the minimum number of qubits where such a guarantee is possible (Berwald et al, 2023). It has been explored for networking applications has (Chen et al, 2022).…”

Section: Modelling Variablesmentioning

confidence: 99%

NP-hard but no longer hard to solve? Using quantum computing to tackle optimization problems

Rhonda

Chancellor²,

Halffmann³

2023

Front. Quantum Sci. Technol.

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In the last decade, public and industrial research funding has moved quantum computing from the early promises of Shor’s algorithm through experiments to the era of noisy intermediate scale quantum devices (NISQ) for solving real-world problems. It is likely that quantum methods can efficiently solve certain (NP-) hard optimization problems where classical approaches fail. In our perspective, we examine the field of quantum optimization, that is, solving optimization problems using quantum computers. We provide an entry point to quantum optimization for researchers from each topic, optimization or quantum computing, by demonstrating advances and obstacles with a suitable use case. We give an overview on problem formulation, available algorithms, and benchmarking. Although we show a proof-of-concept rather than a full benchmark between classical and quantum methods, this gives an idea of the current quality and capabilities of quantum computers for optimization problems. All observations are incorporated in a discussion on some recent quantum optimization breakthroughs, current status, and future directions.

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Section: Modelling Variablesmentioning

confidence: 99%

NP-hard but no longer hard to solve? Using quantum computing to tackle optimization problems

Rhonda

Chancellor²,

Halffmann³

2023

Front. Quantum Sci. Technol.

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“…By contrast, the penalty method gives the QUBO with |L (r) ||L (c) | spins. The domain-wall method formulates the QUBO with (|L (r) | − 1)|L (c) | spins when k (r) = 1 [25] (see also Appendix B). The SVR method at |L (r) | = |L (c) | and k (r) = k (c) = 1 is equivalent to the inserted method in Ref.…”

Section: Two-dimensional Systemmentioning

confidence: 99%

Spin-Variable Reduction Method for Handling Linear Equality Constraints in Ising Machines

Shirai

Togawa

2023

IEEE Trans. Comput.

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We propose a spin-variable reduction method for Ising machines to handle linear equality constraints in a combinatorial optimization problem. Ising machines including quantum-annealing machines can effectively solve combinatorial optimization problems. They are designed to find the lowest-energy solution of a quadratic unconstrained binary optimization (QUBO), which is mapped from the combinatorial optimization problem. The proposed method reduces the number of binary variables to formulate the QUBO compared to the conventional penalty method. We demonstrate a sufficient condition to obtain the optimum of the combinatorial optimization problem in the spin-variable reduction method and its general applicability. We apply it to typical combinatorial optimization problems, such as the graph k-partitioning problem and the quadratic assignment problem. Experiments using simulated-annealing and quantum-annealing based Ising machines demonstrate that the spin-variable reduction method outperforms the penalty method. The proposed method extends the application of Ising machines to larger-size combinatorial optimization problems with linear equality constraints.

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“…The paper entitled 'Trajectory phase transitions in non-interacting systems: all-to-all dynamics and the random energy model' [26] [29] the authors consider domain-wall qubit encodings using integer valued variables and map the original optimization problem into a QUBO of binary variables.…”

Section: Spin Dynamics Topological and Optical Properties Etc In Quan...mentioning

confidence: 99%

“…In the paper by Dridi et al . entitled ‘Understanding domain-wall encoding theoretically and experimentally’ [ 29 ] the authors consider domain-wall qubit encodings using integer valued variables and map the original optimization problem into a QUBO of binary variables.…”

Section: Spin Dynamics Topological and Optical Properties Etc In Quan...mentioning

confidence: 99%

Quantum annealing and computation: challenges and perspectives

Chakrabarti

Leschke

Ray

et al. 2022

Phil. Trans. R. Soc. A.

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In the introductory article of this theme issue, we provide an overview of quantum annealing and computation with a very brief summary of the individual contributions to this issue made by experts as well as a few young researchers. We hope the readers will get the touch of the excitement as well as the perspectives in this unusually active field and important developments there. This article is part of the theme issue ‘Quantum annealing and computation: challenges and perspectives’.

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Understanding domain-wall encoding theoretically and experimentally

Cited by 19 publications

References 52 publications

NP-hard but no longer hard to solve? Using quantum computing to tackle optimization problems

NP-hard but no longer hard to solve? Using quantum computing to tackle optimization problems

Spin-Variable Reduction Method for Handling Linear Equality Constraints in Ising Machines

Quantum annealing and computation: challenges and perspectives

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