We derive upper bounds for the total variation distance, d, between the distributions of two random sums of non-negative integer-valued random variables. The main results are then applied to some important random sums, including cluster binomial and cluster multinomial distributions, to obtain bounds on approximating them to suitable Poisson or compound Poisson distributions. These bounds are generally better than the known results on Poisson and compound Poisson approximations. We also obtain a lower bound for d and illustrate it with an example
Copyright c © 2014 K. Teerapabolarn. This is an open access article distributed under the Creative C...
This paper is devoted to a refinement of Hipp's method in the compound Poisson approximation to the ...
Let n be an integer and A 0,..., A k random subsets of {1,..., n} of fixed sizes a 0,..., a k , resp...
An upper bound for the total variation distance between the distribution of the sum of a sequence of...
We present an extension to the multinomial case of former estimations for univariate Poisson binomia...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
AbstractPoisson approximation in total variation can be successfully established in a wide variety o...
The paper is concerned with approximating the distribution of a sum W of integer valued random varia...
We overview the results on the topic of compound Poisson approximation to the distribution of a sum ...
It is long known that the distribution of a sum Sn of independent non-negative integer-valued random...
The problem of approximating the distribution of a sum S n = Σ i=1n Y i of n discrete random variabl...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
Bobkov SG, Chistyakov G, Götze F. Nonuniform bounds in the Poisson approximation with applications t...
Let (Xn) be a sequence of Bernoulli random variables and N a positive integer value random variable....
AbstractThe distribution of the sum of independent nonidentically distributed Bernoulli random vecto...
Copyright c © 2014 K. Teerapabolarn. This is an open access article distributed under the Creative C...
This paper is devoted to a refinement of Hipp's method in the compound Poisson approximation to the ...
Let n be an integer and A 0,..., A k random subsets of {1,..., n} of fixed sizes a 0,..., a k , resp...
An upper bound for the total variation distance between the distribution of the sum of a sequence of...
We present an extension to the multinomial case of former estimations for univariate Poisson binomia...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
AbstractPoisson approximation in total variation can be successfully established in a wide variety o...
The paper is concerned with approximating the distribution of a sum W of integer valued random varia...
We overview the results on the topic of compound Poisson approximation to the distribution of a sum ...
It is long known that the distribution of a sum Sn of independent non-negative integer-valued random...
The problem of approximating the distribution of a sum S n = Σ i=1n Y i of n discrete random variabl...
Our aim is to investigate Poisson type approximations to the sums of dependent integer-valued random...
Bobkov SG, Chistyakov G, Götze F. Nonuniform bounds in the Poisson approximation with applications t...
Let (Xn) be a sequence of Bernoulli random variables and N a positive integer value random variable....
AbstractThe distribution of the sum of independent nonidentically distributed Bernoulli random vecto...
Copyright c © 2014 K. Teerapabolarn. This is an open access article distributed under the Creative C...
This paper is devoted to a refinement of Hipp's method in the compound Poisson approximation to the ...
Let n be an integer and A 0,..., A k random subsets of {1,..., n} of fixed sizes a 0,..., a k , resp...