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References
T. V. Arak, Approximation ofn-fold convolutions of distributions, having a nonnegative characteristic function, with accompanying laws,Theory Probab. Appl.,25, 221–243 (1980).
T. V. Arak and A. Yu. Zaîtsev, Uniform limit theorems for sums of independent random variables,Proc. Steklov Inst. Math.,174, 1–222 (1988).
A. D. Barbour, L. H. Y. Chen, and W. L. Loh, Compound Poisson approximation for nonnegative random variables via Stein's method,Ann. Probab.,20, 1843–1866 (1992).
H. Bergström, On asymptotic expansion of probability functions,Skand. Aktuarietidskrift,1, 1–34 (1951).
V. Čekanavičius, Lower bound in Bergström identity,Lith. Math. J.,28, 153–169 (1988).
V. Čekanavičius, Approximation by accompanying distributions and asymptotic expansions, I,Lith. Math. J.,29, 75–80 (1989).
V. Čekanavičius, Approximation by accompanying distributions and asymptotic expansions, II,Lith. Math. J.,29, 199–209 (1989).
V. Čekanavičius, Approximation of mixtures of distributions,Lith. Math. J.,31, 243–257 (1991).
U. Gerber, Error bounds for the compound Poisson approximation,Insurance Math. Econ.,3, 191–194 (1984).
C. Hipp, Approximation of aggregate claims distributions by compound Poisson distributions,Insurance Math. Econ.,4, 227–232 (1985).
I. A. Ibragimoc and E. L. Presman, On the rate of approach of the distributions of sums of independent random variables to accompanying distributions,Theory Probab. Appl.,18, 713–727 (1973).
L. Le Cam, On the distribution of sums of independent random variables, in:Bernoulli, Bayes, Laplace (Anniversary volume), Springer-Verlag, Berlin, Heidelberg, New York (1965), pp. 179–202.
E. L. Presman, Two inequalities for symmetric processes and symmetric distributions,Theory Probab. Appl.,26, 815–819 (1982).
S. T. Rachev and L. Rüschendorf, Approximation of sums by compound Poisson distributions with respect to stop-loss distances,Adv. Appl. Probab.,22, 350–374 (1990).
Y. H. Wang, From Poisson to compound Poisson approximations,Math. Sci.,14, 38–49 (1989).
Y. H. Wang, A compound Poisson convergence theorem,Ann. Probab.,19, 452–455 (1991).
A. Yu. Zaîtsev, Estimates of closeness of successive convolutions of symmetric distributions,Theory Probab. Appl.,28, 194–195 (1984).
A. Yu. Zaîtsev, On the accuracy of approximation of distributions of sums of independent random variables, which are nonzero with a small probability, by accompanying laws,Theory Probab. Appl.,28, 657–669 (1984).
A. Yu. Zaîtsev, Estimates of closeness of successive convolutions of multidimensional symmetric distributions,Probab. Theory Related Fields,79, 175–200 (1988).
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Department of Mathematics, Vilnius University, Naugarduko 24, 2006 Vilnius, Lithuania. Translated from Lietuvos Matematikos Rinkinys, Vol. 35, No. 2, pp. 152–170, April–June, 1995.
Translated by. V. Čekanavičius
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Čekanavičius, V. On smoothing properties of compound poisson distributions. Lith Math J 35, 121–135 (1995). https://doi.org/10.1007/BF02341490
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DOI: https://doi.org/10.1007/BF02341490