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Quantum-accelerated multilevel Monte Carlo methods for stochastic differential equations in mathematical finance

Dong An, Noah Linden, Jin-Peng Liu, Ashley Montanaro, Changpeng Shao, Jiasu Wang

2021Quantum52 citationsDOIOpen Access PDF

Abstract

Inspired by recent progress in quantum algorithms for ordinary and partial differential equations, we study quantum algorithms for stochastic differential equations (SDEs). Firstly we provide a quantum algorithm that gives a quadratic speed-up for multilevel Monte Carlo methods in a general setting. As applications, we apply it to compute expectation values determined by classical solutions of SDEs, with improved dependence on precision. We demonstrate the use of this algorithm in a variety of applications arising in mathematical finance, such as the Black-Scholes and Local Volatility models, and Greeks. We also provide a quantum algorithm based on sublinear binomial sampling for the binomial option pricing model with the same improvement.

Topics & Concepts

MathematicsApplied mathematicsMonte Carlo methodStochastic differential equationQuantum Monte CarloMonte Carlo algorithmBinomial options pricing modelSublinear functionMathematical optimizationVariety (cybernetics)Valuation of optionsQuantumQuasi-Monte Carlo methodStochastic partial differential equationImportance samplingMonte Carlo integrationQuadratic equationHybrid Monte CarloStatistical physicsMonte Carlo method in statistical physicsMathematical financeComputer scienceFinite difference methods for option pricingQuantum algorithmDifferential equationMonte Carlo methods for option pricingPartial differential equationQuantum probabilityDifferential (mechanical device)Ordinary differential equationMonte Carlo molecular modelingStochastic volatilityQuantum Computing Algorithms and ArchitectureMathematical Approximation and IntegrationStochastic processes and financial applications