Numerical Valuation of High Dimensional Multivariate European Securities

Barraquand, J.

doi:10.1287/mnsc.41.12.1882

Cited by 49 publications

(32 citation statements)

References 51 publications

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“…In particular, the method has been used for pricing mortgage-backed securities (see Schwartz and Torous (1989), Hutchinson and Zenios (1991)). Barraquand (1993) presents the method of Quadratic Resampling for Monte Carlo valuation of European securities with many underlying assets. The Quadratic Resampling method presented in this paper is an extension of this earlier work to the American pricing problem.…”

Section: April 1994mentioning

confidence: 99%

“…The computation time is proportional to Mn 2 d+k 2 d, the first term corresponding to the drawing of the M Monte Carlo sample paths, and the second to the backwards integration. Hence the memory and time complexities of the SSAP method are polynomial in n. This is to be contrasted with classical PDE methods which are exponential in n. Barraquand (1993) for reducing the variance of multivariate Monte Carlo integration.…”

Section: Backward Integration Algorithmmentioning

confidence: 99%

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Numerical Valuation of High Dimensional Multivariate American Securities

Barraquand¹,

Martineau²

1995

The Journal of Financial and Quantitative Analysis

259

170

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an acknowledgement of the authors and individual contributors to the work; and all applicable portions of the copyright notice. Copying, reproducing, or republishing for any other purpose shall require a license with payment of fee to the Paris Research Laboratory. All rights reserved. ii AbstractWe consider the problem of pricing an American contingent claim whose payoff depends on several sources of uncertainty. Using classical assumptions from the Arbitrage Pricing Theory, the theoretical price can be computed as the maximum over all possible early exercise strategies of the discounted expected cash flows under the modified risk-neutral information process.Several efficient numerical techniques exist for pricing American securities depending on one or few (up to 3) risk sources. They are either lattice-based techniques or finite difference approximations of the Black-Scholes diffusion equation. However, these methods cannot be used for high-dimensional problems, since their memory requirement is exponential in the number of risk sources.In this paper, we present an efficient numerical technique that combines Monte Carlo simulation with a particular partitioning method of the underlying assets space, which we call Stratified State Aggregation (SSA). Using this technique we can compute accurate approximations of prices of American securities with an arbitrary number of underlying assets. Our numerical experiments show that the method is practical for pricing American claims depending on up to 400 risk sources. On all problems for which we could compare the method with known optimal solutions, the price computed through stratified state aggregation was indistinguishable from the optimal theoretical price. Several numerical examples are presented and discussed.iii Acknowledgements This research benefited from discussions with Bruno Langlois. We wish to thank Thierry Pudet for reviewing an earlier draft.iv

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Section: April 1994mentioning

confidence: 99%

Section: Backward Integration Algorithmmentioning

confidence: 99%

Numerical Valuation of High Dimensional Multivariate American Securities

Barraquand¹,

Martineau²

1995

The Journal of Financial and Quantitative Analysis

259

170

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“…Barraquand (1995) introduces quadratic resampling and combines it with the importance sampling. Avramidis (2002) proposes an algorithm that selects the importance sampling density as a mixture of multivariate Normal densities.…”

Section: Introductionmentioning

confidence: 99%

Multi-Level Monte Carlo Simulations with Importance Sampling

Stilger

Poon²

2013

SSRN Journal

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Standard-Nutzungsbedingungen:Die Dokumente auf EconStor dürfen zu eigenen wissenschaftlichen Zwecken und zum Privatgebrauch gespeichert und kopiert werden.Sie dürfen die Dokumente nicht für öffentliche oder kommerzielle Zwecke vervielfältigen, öffentlich ausstellen, öffentlich zugänglich machen, vertreiben oder anderweitig nutzen.Sofern die Verfasser die Dokumente unter Open-Content-Lizenzen (insbesondere CC-Lizenzen) zur Verfügung gestellt haben sollten, gelten abweichend von diesen Nutzungsbedingungen die in der dort genannten Lizenz gewährten Nutzungsrechte. Terms of use: Documents in

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“…In the numerical techniques category, Rubinstein (1994) has developed a multivariate binomial tree, but this is not a very efficient way to price basket options, as the number of nodes grows exponentially with the number of assets in the basket. Barraquand (1995) and Pellizzari (1998) have used Monte Carlo simulations with different variance-reduction techniques. The former used quadratic resampling and the latter developed two control variates based, respectively, on unconditional and conditional expectations of assets.…”

Section: Introductionmentioning

confidence: 99%

Basket Options on Heterogeneous Underlying Assets

Ouertani

2009

SSRN Journal

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In this article, we make the design of a basket option on commodity prices with stochastic convenience yields, exchange rates and zero-coupon bonds. We carry out Monte Carlo simulations to value this option. We use maximum likelihood method to estimate the different parameters of the theoretical model proposed as well as the correlations between these variables. As done in Duan (1994), we apply maximum likelihood approach adapted to unobservable variables to estimate the temporal series of the convenience yield as well as its parameters. Monte Carlo studies are conducted to examine the performance of the maximum likelihood technique in finite samples of simulated data.

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Numerical Valuation of High Dimensional Multivariate European Securities

Cited by 49 publications

References 51 publications

Numerical Valuation of High Dimensional Multivariate American Securities

Numerical Valuation of High Dimensional Multivariate American Securities

Multi-Level Monte Carlo Simulations with Importance Sampling

Basket Options on Heterogeneous Underlying Assets

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