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Literature cited
S. N. Bernshtein, Collected Works [in Russian], Vol. 4, Nauka, Moscow (1964), pp. 394–395.
Yu. V. Linnik, Collected Works. Mathematical Statics [in Russian], Nauka, Leningrad (1982).
Hoang Huu Nhu, “On stability of some characterizations of a normal population,” Teor. Veroyatn. Primen.,13, No. 2, 308–314 (1968).
L. D. Meshalkin, “On the robustness of some characterizations of the normal distribution,” Ann. Math. Stat.,39, No. 5, 1747–1750 (1969).
B. Bednarek-Kozek and A. Kozek, “On the robustness of properties characterizing the normal distribution,” Zastowania Matem. (Applicat. Math.),13, No. 2, 215–230 (1972).
Yu. R. Gabovich, “On stability of some characteristic properties of the normal distribution,” Teor. Veroyatn. Primen.,19, No. 2, 374–382 (1974).
Yu. R. Gabovich, Stability of Some Characterizations of the Normal Distribution by Independence of Statistics [in Russian], Thesis, Moskovskii Fiziko-Tekhnicheskii Inst. (1974).
L. B. Klebanov and R. V. Yanushkyavichyus, “On ɛ-independence of the statistics X1 + X2 and X1 — X2,” Litovskii Mat. Sb.,25, No. 3 (1985).
R. V. Yanushkyavichyus and O. L. Yanushkyavichene, “The method of multiple transformations in stability theory,” in: Stability Problems for Stochastic Models [in Russian], VNIISI, Moscow (1982), pp. 115–126.
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Translated from Problemy Ustoichivosti Stokhasticheskikh Modelei — Trudy Seminara, pp. 160–170, 1985.
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Yanushkyavichyus, R.V. Almost-independent statistics X1+X2 and X1−X2 in the uniform metric. J Math Sci 40, 580–589 (1988). https://doi.org/10.1007/BF01083658
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DOI: https://doi.org/10.1007/BF01083658