Asymptotic theory for Brownian semi-stationary processes with application to turbulence

Corcuera, José Manuel; Hedevang, Emil; Pakkanen, Mikko S.; Podolskij, Mark

doi:10.1016/j.spa.2013.03.011

Cited by 49 publications

(133 citation statements)

References 29 publications

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“…. , m, of the BSS process X given by (2.1), for some m ∈ N. Barndorff-Nielsen et al [6] and Corcuera et al [16] discuss how the roughness index α can be estimated consistently as m → ∞. The method is based on the change-of-frequency (COF) statistics…”

Section: Estimation Of the Roughness Parametermentioning

confidence: 99%

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Hybrid scheme for Brownian semistationary processes

2017

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We introduce a simulation scheme for Brownian semistationary processes, which is based on discretizing the stochastic integral representation of the process in the time domain. We assume that the kernel function of the process is regularly varying at zero. The novel feature of the scheme is to approximate the kernel function by a power function near zero and by a step function elsewhere. The resulting approximation of the process is a combination of Wiener integrals of the power function and a Riemann sum, which is why we call this method a hybrid scheme. Our main theoretical result describes the asymptotics of the mean square error of the hybrid scheme, and we observe that the scheme leads to a substantial improvement of accuracy compared to the ordinary forward Riemann-sum scheme, while having the same computational complexity. We exemplify the use of the hybrid scheme by two numerical experiments, where we examine the finite-sample properties of an estimator of the roughness parameter of a Brownian semistationary process and study Monte Carlo option pricing in the rough Bergomi model of Bayer et al. (Quant. Finance 16:887-904, 2016), respectively. B M.S. Pakkanen

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Section: Estimation Of the Roughness Parametermentioning

confidence: 99%

“…By now these processes have been applied in various contexts, most notably in the study of turbulence in physics [7,16] and in finance as models of energy prices [4,11]. A BSS process X is defined via the integral representation…”

Section: Introductionmentioning

confidence: 99%

Hybrid scheme for Brownian semistationary processes

2017

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“…In the past years stochastic analysis, probabilistic properties and statistical inference for Lévy semi-stationary processes have been studied in numerous papers. We refer to [2,3,6,7,11,12,15,17,20,25] for the mathematical theory as well as to [5,26] for a recent survey on theory of ambit fields and their applications. For practical applications in sciences numerical approximation of Lévy (Brownian) semi-stationary processes, or, more generally, of ambit fields, is an important issue.…”

Section: G(t S X ξ)σ S (ξ )L(ds Dξ)+ D T (X)mentioning

confidence: 99%

“…When introducing the approximation at (16), we obviously obtain two types of error: The Riemann sum approximation error and tail approximation error. Condition (17) guarantees that the Riemann sum approximation error will dominate.…”

Section: A Weak Limit Theorem For the Fourier Approximation Schemementioning

confidence: 99%

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A Weak Limit Theorem for Numerical Approximation of Brownian Semi-stationary Processes

Podolskij

Thamrongrat

2015

Stochastics of Environmental and Financial Economics

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In this paper we present a weak limit theorem for a numerical approximation of Brownian semi-stationary processes studied in [14]. In the original work of [14] the authors propose to use Fourier transformation to embed a given one dimensional (Lévy) Brownian semi-stationary process into a two-parameter stochastic field. For the latter they use a simple iteration procedure and study the strong approximation error of the resulting numerical scheme given that the volatility process is fully observed. In this work we present the corresponding weak limit theorem for the setting, where the volatility/drift process needs to be numerically simulated. In particular, weak approximation errors for smooth test functions can be obtained from our asymptotic theory.

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