Domains of attraction of mixing sequences

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I. A. Ibragimov and Yu. V. Linnik, Independent and Stationary Random Variables, Nauka, Moscow (1965).
Google Scholar
E. Seneta, Regularly Varying Functions, Nauka, Moscow (1985).
Google Scholar
M. Peligrad, “An invariance principle for φ-mixing sequences,” Ann. Prob.,13, No. 4 1304–1313 (1985).
Google Scholar
R. Bradley, “On φ-mixing condition for stationary random sequences,” Duke Math. J.,47, 421–433 (1980).
Google Scholar
M. Peligrad, “Invariance principle for mixing sequences of random variables,” Ann. Prob.,10, No. 10, 968–981 (1982).
Google Scholar
J. Samur, “Convergence of sums of mixing triangular arrays of random vectors with stationary rows,” Ann. Prob.,12, No. 2, 390–426 (1984).
Google Scholar

Authors

A. G. Grin'
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Minsk. Translated from Siberski Matematicheskii Zhurnal, Vol. 31, No. 1, pp. 53–63, January–February, 1990.

Grin', A.G. Domains of attraction of mixing sequences. Sib Math J 31, 43–52 (1990). https://doi.org/10.1007/BF00971148

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