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Limit theorem for polynomials of a linear process with long-range dependence

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Literature Cited

  1. F. Avram and M. S. Taqqu, “Generalized powers of strongly dependent random variables,” Ann. Probab.,15, No. 2, 767–775 (1987).

    Google Scholar 

  2. R. L. Dobrushin and P. Major, “Noncentral limit theorems for nonlinear functionals of Gaussian fields,” Z. Wahr. Verw. Geb.,50, 27–52 (1979).

    Google Scholar 

  3. V. V. Gorodetskii, “Invariance principle for functions of stationary connected Gaussian variables,” J. Sov. Math.,24, No. 5 (1984).

  4. M. Rosenblatt, “Independence and dependence,” in: Proc. 4th Berkeley Symp. Math. Statist. Probab., Univ. California Press, Berkeley (1961), pp. 411–443.

    Google Scholar 

  5. D. Surgailis, “Zones of attraction of self-similar multiple integrals,” Liet. Mat. Rinkinys,22, No. 3, 185–201 (1982).

    Google Scholar 

  6. M. S. Taqqu, “Weak convergence to fractional Brownian motion and to the Rosenblatt process,” Z. Wahr. Verw. Geb.,31, 287–302 (1975).

    Google Scholar 

  7. M. S. Taqqu, “Convergence of integrated processes of arbitrary Hermite rank,” Z. Wahr. Verw. Geb.,50, 53–83 (1979).

    Google Scholar 

  8. J. W. Lamperti, “Semistable stochastic processes,” Trans. Am. Math. Soc.,104, 62–78 (1962).

    Google Scholar 

  9. M. Rosenblatt, “Limit theorems for Fourier transforms of functionals of Gaussian sequences,” Z. Wahr. Verw. Geb.,55, 123–132 (1981).

    Google Scholar 

  10. P. Major, “Limit theorems for nonlinear functionals of Gaussian sequences,” Z. Wahr. Verw. Geb.,57, 129–158 (1981).

    Google Scholar 

  11. P. Major, Multiple Wiener-Ito Integrals, Springer, New York (1981).

    Google Scholar 

  12. L. Giraitis and D. Surgailis, “Multivariate Appell polynomials and the central limit theorem,” in: E. Eberlein and M. S. Taqqu (eds.), Dependence in Probability and Statistics, Birkhäuser, Boston (1986), pp. 21–71.

    Google Scholar 

  13. D. Surgailis, “On Poisson multiple stochastic integrals and associated equilibrium Markov processes,” Lect. Notes Control Inf. Sci.,49, 233–248 (1983).

    Google Scholar 

  14. V. V. Gorodetskii, “Convergence to semistable Gaussian processes,” Teor. Veroyatn. Primen.,22, No. 3, 513–522 (1977).

    Google Scholar 

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Authors
  1. L. Giraitis
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  2. D. Surgailis
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Additional information

Institute of Mathematics and Cybernetics, Academy of Sciences of the Lithuanian SSR. Translated from Litovskii Matematicheskii Sbornik (Lietuvos Matematikos Rinkinys), Vol. 29, No. 2, pp. 290–311, April–June, 1989.

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Giraitis, L., Surgailis, D. Limit theorem for polynomials of a linear process with long-range dependence. Lith Math J 29, 128–145 (1989). https://doi.org/10.1007/BF00966075

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  • DOI: https://doi.org/10.1007/BF00966075

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