(9) M. Csoergoe, Gaussian processes, strong approximations: An interplay, in: Aspects statistiques et aspects physiques des processus gaussiens, Saint- Flour 1980, Colloq. Int. C.N.R.S. 307, 131-229 (1981).



(10) M. Csörgő - P. Révész, Strong approximations in probability and statistics, Probability and Mathematical Statistics. New York-San Francisco-London: Academic Press, a Subsidiary of Harcourt Brace Jovanovich, Publishers; Budapest: Akadémiai Kiadó. (1981).

PDF

(11) L. Pace, In: 14-th European Meeting of Statisticians, Abstracts, p. 244, Wroclaw (1981).



(12) D.D. Cotterill - M. Csörgő, On the limiting distribution of and critical values for the multivariate Cramer-von Mises statistic, Ann. Stat. 10, 233-244 (1982).

PDF

(13) Miklós Csörgő, Invariance principles for empirical processes, in: P.R. Krishnaiah (ed.) - P.K. Sen (ed.), Nonparametric methods, Handb. Stat. 4, North Holland, Amsterdam - N.Y. - Oxford, 431-462 (1984).

PDF

(14) V.Yu. Bentkus - R.Eh. Zitikis, Remark on the Cramer-von Mises-Smirnov criterion. (English. Russian original) Lith. Math. J. 28, No.1, 8-13 (1988); translation from Lit. Mat. Sb. 28, No.1, 14-22 (1988).

PDF

(15) R.E. Zitikis, Asymptotic expansions in the local limit theorem for \omega _2n statistics. (Russian. English summary) Lit. Mat. Sb. 28, No.3, 461-474 (1988).

PDF

(16) R.E. Zitikis, Asymptotic expansions for derivatives of the distribution function of the Anderson-Darling statistic. (Russian) Lit. Mat. Sb. 29, No.1, 35-53 (1989).

PDF

(17) R. Zitikis, Smoothness of distribution function of FL-statistic. I. (English. Russian original) Lith. Math. J. 30, No.2, 97-106 (1990); translation from Lit. Mat. Sb. 30, No.2, 233-246 (1990).

PDF

(18) Vidmantas Bentkus - Friedrich Götze - Ricardas Zitikis, Asymptotic expansions in the integral and local limit theorems in Banach spaces with applications to omega-statistics, J. Theor. Probab. 6, No.4, 727-780 (1993).

PDF

(19) F. Götze - R. Zitikis, Edgeworth expansions and bootstrap for degenerate von Mises statistics, Probab. Math. Stat. 15, 327-351 (1995).

PDF

(20) V. Bentkus - F. Götze - V. Paulauskas - A. Račkauskas, In: Limit Theorems of Probability Theory (Yu.V. Prokhorov (ed.) - V. Statulevivcius (ed.); The accuracy of Gaussian approximation in Banach spaces. Transl. from the Russian by B. Seckler. Berlin: Springer. 25-111 (2000).

PDF

(21) J. Sunklodas, Approximation of distributions of sums of weakly dependent random variables by the normal distribution. (Russian) R. V. Gamkrelidze (ed.) et al., Probability theory - 6. Limit theorems in probability theory. Moskva: Vsesoyuznyj Institut Nauchnoj i Tekhnicheskoj Informatsii, Itogi Nauki Tekh., Ser. Sovrem. Probl. Mat., Fundam. Napravleniya. 81, 140-199 (1991).



(22) A. Bikelis; A. Zemaitis; Asymptotic expansion for the probability of large deviations. II, Lithuanian Mathematical Journal, 14 No.4, 567--572 (2010)

HTM