Quantum algorithm for calculating risk contributions in a credit portfolio

Miyamoto, Koichi

doi:10.1140/epjqt/s40507-022-00153-y

Cited by 4 publications

(2 citation statements)

References 56 publications

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“…In recent years, applications of quantum computers have been discussed in financial engineering. Specifically, the applications include portfolio optimization [1], [2], [3], risk measurement [4], [5], [6], [7], [8], and derivative pricing [9], [10], [11], [12], [13], [14], [15], [16], [17], [18], [19], [20], [21], [22]. Comprehensive reviews of these topics are presented in [23], [24], [25], and [26].…”

Section: Introductionmentioning

confidence: 99%

Pricing Multiasset Derivatives by Variational Quantum Algorithms

Kubo

Miyamoto

Mitarai

et al. 2023

IEEE Trans. Quantum Eng.

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Pricing a multiasset derivative is an important problem in financial engineering, both theoretically and practically. Although it is suitable to numerically solve partial differential equations to calculate the prices of certain types of derivatives, the computational complexity increases exponentially as the number of underlying assets increases in some classical methods, such as the finite difference method. Therefore, there are efforts to reduce the computational complexity by using quantum computation. However, when solving with naive quantum algorithms, the target derivative price is embedded in the amplitude of one basis of the quantum state, and so an exponential complexity is required to obtain the solution. To avoid the bottleneck, our previous study utilizes the fact that the present price of a derivative can be obtained by its discounted expected value at any future point in time and shows that the quantum algorithm can reduce the complexity. In this article, to make the algorithm feasible to run on a small quantum computer, we use variational quantum simulation to solve the Black-Scholes equation and compute the derivative price from the inner product between the solution and a probability distribution. This avoids the measurement bottleneck of the naive approach and would provide quantum speedup even in noisy quantum computers. We also conduct numerical experiments to validate our method. Our method will be an important breakthrough in derivative pricing using small-scale quantum computers. INDEX TERMSDerivative pricing, finite difference methods (FDMs), variational quantum computing. Engineering uantum Transactions on IEEE Kubo et al.: PRICING MULTIASSET DERIVATIVES BY VARIATIONAL QUANTUM ALGORITHMS

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Section: Introductionmentioning

confidence: 99%

Pricing Multiasset Derivatives by Variational Quantum Algorithms

Kubo

Miyamoto

Mitarai

et al. 2023

IEEE Trans. Quantum Eng.

Self Cite

View full text Add to dashboard Cite

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“…For example, it is used in the quantum algorithm for Monte Carlo integration (QMCI) [3], which estimates the expectation of a random variable quadratically faster than the classical Monte Carlo method. Furthermore, QMCI has many applications in industry, for example, derivative pricing [4][5][6][7][8][9] and risk measurement [10][11][12][13][14] in finance. We can say that QAE can be a foundation of industrial quantum advantage.…”

Section: Introductionmentioning

confidence: 99%

Bermudan option pricing by quantum amplitude estimation and Chebyshev interpolation

Miyamoto

2022

EPJ Quantum Technol.

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Pricing of financial derivatives, in particular early exercisable options such as Bermudan options, is an important but heavy numerical task in financial institutions, and its speed-up will provide a large business impact. Recently, applications of quantum computing to financial problems have been started to be investigated. In this paper, we first propose a quantum algorithm for Bermudan option pricing. This method performs the approximation of the continuation value, which is a crucial part of Bermudan option pricing, by Chebyshev interpolation, using the values at interpolation nodes estimated by quantum amplitude estimation. In this method, the number of calls to the oracle to generate underlying asset price paths scales as $\widetilde{O}(\epsilon ^{-1})$ O ˜ ( ϵ − 1 ) , where ϵ is the error tolerance of the option price. This means the quadratic speed-up compared with classical Monte Carlo-based methods such as least-squares Monte Carlo, in which the oracle call number is $\widetilde{O}(\epsilon ^{-2})$ O ˜ ( ϵ − 2 ) .

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Quantum computing for financial risk measurement

Wilkens¹,

Moorhouse

2023

Quantum Inf Process

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Quantum computing allows a significant speed-up over traditional CPU- and GPU-based algorithms when applied to particular mathematical challenges such as optimisation and simulation. Despite promising advances and extensive research in hard- and software developments, currently available quantum systems are still largely limited in their capability. In line with this, practical applications in quantitative finance are still in their infancy. This paper analyses requirements and concrete approaches for the application to risk management in a financial institution. On the examples of Value-at-Risk for market risk and Potential Future Exposure for counterparty credit risk, the main contribution lies in going beyond textbook illustrations and instead exploring must-have model features and their quantum implementations. While conceptual solutions and small-scale circuits are feasible at this stage, the leap needed for real-life applications is still significant. In order to build a usable risk measurement system, the hardware capacity—measured in number of qubits—would need to increase by several magnitudes from their current value of about $$10^2$$ 10 2 . Quantum noise poses an additional challenge, and research into its control and mitigation would need to advance in order to render risk measurement applications deployable in practice. Overall, given the maturity of established classical simulation-based approaches that allow risk computations in reasonable time and with sufficient accuracy, the business case for a move to quantum solutions is not very strong at this point.

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Quantum algorithm for calculating risk contributions in a credit portfolio

Cited by 4 publications

References 56 publications

Pricing Multiasset Derivatives by Variational Quantum Algorithms

Pricing Multiasset Derivatives by Variational Quantum Algorithms

Bermudan option pricing by quantum amplitude estimation and Chebyshev interpolation

Quantum computing for financial risk measurement

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