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Quantum Algorithms for Mixed Binary Optimization Applied to Transaction Settlement

Lee Braine, Daniel J. Egger, Jennifer R. Glick, Stefan Woerner

2021IEEE Transactions on Quantum Engineering55 citationsDOIOpen Access PDF

Abstract

In this article, we extend variational quantum optimization algorithms for quadratic unconstrained binary optimization problems to the class of mixed binary optimization problems. This allows us to combine binary decision variables with continuous decision variables, which, for instance, enables the modeling of inequality constraints via slack variables. We propose two heuristics and introduce the transaction settlement problem to demonstrate them. Transaction settlement is defined as the exchange of securities and cash between parties and is crucial to financial market infrastructure. We test our algorithms using classical simulation as well as real quantum devices provided by IBM quantum.

Topics & Concepts

Quadratic unconstrained binary optimizationHeuristicsComputer scienceBinary numberQuantumSettlement (finance)AlgorithmDatabase transactionTransaction costClass (philosophy)Mathematical optimizationOptimization problemQuantum computerMathematicsFinanceEconomicsArtificial intelligenceWorld Wide WebArithmeticPhysicsProgramming languageQuantum mechanicsPaymentQuantum Computing Algorithms and ArchitectureQuantum Information and CryptographyQuantum-Dot Cellular Automata
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