Statistical Romberg extrapolation: A new variance reduction method and applications to option pricing

Kebaier, Ahmed

doi:10.1214/105051605000000511

Cited by 114 publications

(103 citation statements)

References 14 publications

(22 reference statements)

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“…The method extends the recent work of Kebaier [14] who proved that the computational cost of the simple problem described above can be reduced to O( −2.5 ) through the appropriate combination of results obtained using two levels of timestep, h and O(h 1/2 ). This is closely related to a more generally applicable approach of quasi control variates analysed by Emsermann and Simon [5].…”

Section: Introductionsupporting

confidence: 53%

Multilevel Monte Carlo Path Simulation

Giles

2008

Operations Research

1,313

1,803

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We show that multigrid ideas can be used to reduce the computational complexity of estimating an expected value arising from a stochastic differential equation using Monte Carlo path simulations. In the simplest case of a Lipschitz payoff and an Euler discretisation, the computational cost to achieve an accuracy of O( ) is reduced from O( −3 ) to O( −2 (log ) 2 ). The analysis is supported by numerical results showing significant computational savings.

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Section: Introductionsupporting

confidence: 53%

Multilevel Monte Carlo Path Simulation

Giles

2008

Operations Research

1,313

1,803

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“…Moreover, using once again relation (18) we deduce the uniform boundedness of the family (κ ε ) ε>0 on the compact subset K. Hence, combining all these results together with assumption (WE υε ), we deduce the existence of c 3 > 0 not depending on ε such that…”

Section: Central Limit Theoremsmentioning

confidence: 54%

“…On the other hand, thanks to relation (18) we have the uniform equicontinuity of the family (κ ε ) ε>0 on the compact subset K. So, we only need to check this last property for the family (γ ε ) ε>0 in view to use after that Lemma 8.1 and then deduce the convergence of…”

Section: Central Limit Theoremsmentioning

confidence: 99%

“…Therefore, if we denote by K(ε) the cost of a single simulation of L ε T , then the total time complexity necessary to achieve the precision σ(ε) is given by C M C = O(K(ε)σ −2 (ε)) (see subsection 3.3). In order to improve the performance of this method we use the idea of the statistical Romberg method introduced by Kebaier [18] in the setting of Euler Monte Carlo methods for stochastic differential equations driven by a standard Brownian Motion which is also related to the well known Romberg's method introduced by Talay and Tubaro in [28]. Inspired by this technique, we introduce a novel method for the computation of our initial target.…”

Section: Introductionmentioning

confidence: 99%

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Importance sampling and statistical Romberg method for Lévy processes

Alaya

Hajji

Kebaier

2016

Stochastic Processes and their Applications

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An important family of stochastic processes arising in many areas of applied probability is the class of Lévy processes. Generally, such processes are not simulatable especially for those with infinite activity. In practice, it is common to approximate them by truncating the jumps at some cut-off size ε (ε ց 0). This procedure leads us to consider a simulatable compound Poisson process. This paper first introduces, for this setting, the statistical Romberg method to improve the complexity of the classical Monte Carlo one. Roughly speaking, we use many sample paths with a coarse cut-off ε β , β ∈ (0, 1), and few additional sample paths with a fine cut-off ε. Central limit theorems of LindebergFeller type for both Monte Carlo and statistical Romberg method for the inferred errors depending on the parameter ε are proved. This leads to an accurate description of the optimal choice of parameters with explicit limit variances. Afterwards, the authors propose a stochastic approximation method of finding the optimal measure change by Esscher transform for Lévy processes with Monte Carlo and statistical Romberg importance sampling variance reduction. Furthermore, we develop new adaptive Monte Carlo and statistical Romberg algorithms and prove the associated central limit theorems. Finally, numerical simulations are processed to illustrate the efficiency of the adaptive statistical Romberg method that reduces at the same time the variance and the computational effort associated to the effective computation of option prices when the underlying asset process follows an exponential pure jump CGMY model. MSC 2010: 60E07, 60G51, 60F05, 62L20, 65C05, 60H35.

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“…We propose and analyze a new estimator called Multilevel Richardson-Romberg (ML2R) which combines the higher order bias cancellation of the Multistep Richardson-Romberg method introduced in [61] and the variance control resulting from the stratification in the Multilevel Monte Carlo (MLMC) method introduced in [29] (see also [37,43]). The Multilevel Monte Carlo method has been extensively applied to various fields of numerical probability recently.…”

Section: Multilevel Richardson-romberg Extrapolationmentioning

confidence: 99%

Recent advances in various fields of numerical probability

et al. 2015

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Abstract. The goal of this paper is to present a series of recent contributions on some various problems of numerical probability. Beginning with the Richardson-Romberg Multilevel Monte-Carlo method which, among other fields of applications, is a very efficient method for the approximation of diffusion processes, we focus on some adaptive multilevel splitting algorithms for rare event simulation. Then, the third part is devoted to the simulation of McKean-Vlasov forward and decoupled forwardbackward stochastic differential equations by some cubature algorithms. Finally, we tackle the problem of the weak error estimation in total variation norm for a general Markov semi-group.

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Statistical Romberg extrapolation: A new variance reduction method and applications to option pricing

Cited by 114 publications

References 14 publications

Multilevel Monte Carlo Path Simulation

Multilevel Monte Carlo Path Simulation

Importance sampling and statistical Romberg method for Lévy processes

Recent advances in various fields of numerical probability

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