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Modern Stochastics: Theory and Applications


A multiplicative wavelet-based model for simulation of a random process
Volume 2, Issue 4 (2015), pp. 309–325
Pub. online: 24 September 2015      Type: Research Article      Open accessOpen Access
Received
21 July 2015
Revised
8 September 2015
Accepted
11 September 2015
Published
24 September 2015

Abstract

We find a multiplicative wavelet-based representation for stochastic processes that can be represented as the exponent of a second-order centered random process. We propose a wavelet-based model for simulation of such a stochastic process and find its rates of convergence to the process in different functional spaces in terms of approximation with given accuracy and reliability. This approach allows us to simulate stochastic processes (including certain classes of processes with heavy tails) with given accuracy and reliability.

References

[1] 
Buldygin, V.V., Kozachenko, Y.V.: Metric Characterization of Random Variables and Random Processes. Am. Math. Soc., Boca Raton (2000). MR1743716
[2] 
Härdle, W., Kerkyacharian, G., Picard, D., Tsybakov, A.: Wavelets, Approximation and Statistical Applications. Springer, New York (1998). MR1618204. doi:10.1007/978-1-4612-2222-4
[3] 
Kozachenko, Y., Kovalchuk, Y.: Boundary-value problems with random initial conditions and functional series from $\mathrm{Sub}_{\varphi }(\varOmega )$. I. Ukr. Math. J. 50, 572–585 (1998). MR1698149. doi:10.1007/BF02487389
[4] 
Kozachenko, Y., Pogoriliak, O.: Simulation of Cox processes driven by random Gaussian field. Methodol. Comput. Appl. Probab. 13, 511–521 (2011). MR2822393. doi:10.1007/s11009-010-9169-8
[5] 
Kozachenko, Y., Turchyn, Y.: On Karhunen–Loeve-like expansion for a class of random processes. Int. J. Stat. Manag. Syst. 3, 43–55 (2008)
[6] 
Kozachenko, Y., Sottinen, T., Vasylyk, O.: Simulation of weakly self-similar stationary increment $\mathrm{Sub}_{\varphi }(\varOmega )$-processes: a series expansion approach. Methodol. Comput. Appl. Probab. 7, 379–400 (2005). MR2210587. doi:10.1007/s11009-005-4523-y
[7] 
Kozachenko, Y., Pashko, A., Rozora, I.: Simulation of Random Processes and Fields. Zadruga, Kyiv (2007) (in Ukrainian)
[8] 
Kozachenko, Y., Rozora, I., Turchyn, Y.: Properties of some random series. Commun. Stat., Theory Methods 40, 3672–3683 (2011). MR2860766. doi:10.1080/03610926.2011.581188
[9] 
Ogorodnikov, V.A., Prigarin, S.M.: Numerical Modelling of Random Processes and Fields: Algorithms and Applications. VSP, Utrecht (1996). MR1419502
[10] 
Ripley, B.D.: Stochastic Simulation. John Wiley & Sons, New York (1987). MR0875224. doi:10.1002/9780470316726
[11] 
Turchyn, I.: Simulation of a strictly sub-Gaussian random field. Stat. Probab. Lett. 92, 183–189 (2014). MR3230492. doi:10.1016/j.spl.2014.05.022
[12] 
Turchyn, I.: Haar wavelet and simulation of stochastic processes. Contemp. Math. Stat. 3, 1–7 (2015)
[13] 
Turchyn, Y.: Simulation of sub-Gaussian processes using wavelets. Monte Carlo Methods Appl. 17, 215–231 (2011). MR2846496. doi:10.1515/MCMA.2011.010

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Copyright
© 2015 The Author(s). Published by VTeX
Open access article under the CC BY license.

Keywords
Sub-Gaussian random processes simulation

MSC2010
60G12

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