Add to ORKGWe consider a triangular array of independent identically distributed discrete random variables. We assume that the probability distribution of sums satisfies the necessary and sufficient conditions for the weak convergence to the compound Poisson distribution. The first known result (the case where random variables take only integer values) is due to B. Grigelionis, who estimated the convergence rate to the compound Poisson distribution. We extend the summation of random variables by including the variables taking discrete values and by using the Grigelionis ideas to obtain “lengthy” asymptotic expansions. These expansions are based on the well-known Bergström identity [H. Bergström, On asymptotic expansions of probability functions, Scand...
AbstractArrays of random vectors with values in Rd stationary in rows, are investigated. By the assu...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
In this work it is researched H. Bergstrom work about asymptotic behavior of convolutions of probabi...
We present conditions sufficient for the weak convergence to a compound Poisson distribution of the ...
In this paper we show that it is possible to write the Laplace transform of the Burr distribution as...
In his 1972 Periodica Mathematica Hungarica paper, H. Bergström stated a theorem on convergence in d...
Let {Xn,i, 1 [less-than-or-equals, slant] i [less-than-or-equals, slant] n,n [greater-or-equal, slan...
The aim of this paper is to give some new characterizations of discrete compound Poisson distributio...
AbstractThe well-known Berry-Esseen theorem concerning the rate of convergence to a stable law for a...
We present two methods of constructing multivariate compound distributions and investigate the corre...
We consider the asymptotic behavior of the convolution P n.pnA/ of a k-dimensional probability distr...
AbstractWe present two methods of constructing multivariate compound distributions and investigate t...
AbstractThis paper concerns an asymptotic expansion for the distribution of the sum of independent z...
AbstractArrays of random vectors with values in Rd stationary in rows, are investigated. By the assu...
AbstractThe distribution of the sum of independent nonidentically distributed Bernoulli random vecto...
AbstractArrays of random vectors with values in Rd stationary in rows, are investigated. By the assu...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
In this work it is researched H. Bergstrom work about asymptotic behavior of convolutions of probabi...
We present conditions sufficient for the weak convergence to a compound Poisson distribution of the ...
In this paper we show that it is possible to write the Laplace transform of the Burr distribution as...
In his 1972 Periodica Mathematica Hungarica paper, H. Bergström stated a theorem on convergence in d...
Let {Xn,i, 1 [less-than-or-equals, slant] i [less-than-or-equals, slant] n,n [greater-or-equal, slan...
The aim of this paper is to give some new characterizations of discrete compound Poisson distributio...
AbstractThe well-known Berry-Esseen theorem concerning the rate of convergence to a stable law for a...
We present two methods of constructing multivariate compound distributions and investigate the corre...
We consider the asymptotic behavior of the convolution P n.pnA/ of a k-dimensional probability distr...
AbstractWe present two methods of constructing multivariate compound distributions and investigate t...
AbstractThis paper concerns an asymptotic expansion for the distribution of the sum of independent z...
AbstractArrays of random vectors with values in Rd stationary in rows, are investigated. By the assu...
AbstractThe distribution of the sum of independent nonidentically distributed Bernoulli random vecto...
AbstractArrays of random vectors with values in Rd stationary in rows, are investigated. By the assu...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
In this work it is researched H. Bergstrom work about asymptotic behavior of convolutions of probabi...