Asymptotic properties of power variations of Lévy processes

Jacod, Jean

doi:10.1051/ps:2007013

Jacod, Jean

ESAIM: Probability and Statistics, Tome 11 (2007), pp. 173-196.

Résumé

We determine the asymptotic behavior of the realized power variations, and more generally of sums of a given function $f$ evaluated at the increments of a Lévy process between the successive times $i Δ_{n}$ for $i$ = 0,1,..., $n$ . One can elucidate completely the first order behavior, that is the convergence in probability of such sums, possibly after normalization and/or centering: it turns out that there is a rather wide variety of possible behaviors, depending on the structure of jumps and on the chosen test function $f$ . As for the associated central limit theorem, one can show some versions of it, but unfortunately in a limited number of cases only: in some other cases a CLT just does not exist.

DOI : 10.1051/ps:2007013

Classification : 60F17, 60G51
Mots-clés : central limit theorem, quadratic variation, power variation, Lévy processes

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     title = {Asymptotic properties of power variations of {L\'evy} processes},
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     language = {en},
     url = {https://www.numdam.org/articles/10.1051/ps:2007013/}
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Jacod, Jean. Asymptotic properties of power variations of Lévy processes. ESAIM: Probability and Statistics, Tome 11 (2007), pp. 173-196. doi : 10.1051/ps:2007013. https://www.numdam.org/articles/10.1051/ps:2007013/

Bibliographie
Cité par

[1] Y. Aït-Sahalia and J. Jacod, Volatility estimators for discretely sampled Lévy processes. To appear in Annals of Statistics (2005). | Zbl

[2] T.G. Andersen, T. Bollerslev and F.X. Diebold, Parametric and nonparametric measurement of volatility, in Handbook of Financial Econometrics, Y. Aït-Sahalia and L.P. Hansen Eds., Amsterdam: North Holland. Forthcoming (2005).

[3] O.E. Barndorff-Nielsen and N. Shephard, Realised power variation and stochastic volatility. Bernoulli 9 (2003) 243-265. Correction published in pages 1109-1111. | Zbl

[4] O.E. Barndorff-Nielsen, S.E. Graversen, J. Jacod, M. Podolskij and N. Shephard, A central limit theorem for realised bipower variations of continuous semimartingales, in From Stochastic calculus to mathematical finance, the Shiryaev Festschrift, Y. Kabanov, R. Liptser, J. Stoyanov Eds., Springer-Verlag, Berlin (2006) 33-69. | Zbl

[5] O.E. Barndorff-Nielsen, N. Shephard and M. Winkel, Limit theorems for multipower variation in the presence of jumps. Stoch. Processes Appl. 116 (2006) 796-806. | Zbl

[6] A.N. Borodin and I.A. Ibragimov, Limit Theorems for Functionals of Random Walks. Proceedings Staklov Inst. Math. 195, A.M.S. (1995). | MR | Zbl

[7] J. Jacod and A. Shiryaev, Limit Theorems for Stochastic Processes. 2nd ed., Springer-Verlag, Berlin (2003). | MR | Zbl

[8] J. Jacod and P. Protter, Asymptotic error distributions for the Euler method for stochastic differential equations. Ann. Probab. 26 (1998) 267-307. | Zbl

[9] J. Jacod, The Euler scheme for Lévy driven stochastic differential equations: limit theorems. Ann. Probab. 32 (2004) 1830-1972. | Zbl

[10] J. Jacod, A. Jakubowski and J. Mémin, On asymptotic error in discretization of processes. Ann. Probab. 31 (2003) 592-608. | Zbl

[11] D. Lépingle, La variation d’ordre $p$ des semimartingales. Z. für Wahr. Th. 36 (1976) 285-316. | Zbl

[12] C. Mancini, Disentangling the jumps of the diffusion in a geometric jumping Brownian motion. Giornale dell'Instituto Italiano degli Attuari LXIV (2001) 19-47.

[13] J. Woerner, Power and multipower variation: inference for high frequency data, in Stochastic Finance, A.N. Shiryaev, M. do Rosário Grosshino, P. Oliviera, M. Esquivel Eds., Springer-Verlag, Berlin (2006) 343-354. | Zbl

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