Your search keyword '"Wen-Chen Chen"' showing total 2 results

1. On the Weak form of Zipf's law

Author

Wen-Chen Chen

Subjects

Large class, Statistics and Probability, Zipf's law, Maximum likelihood, General Mathematics, 010102 general mathematics, 01 natural sciences, Combinatorics, 010104 statistics & probability, Convergence of random variables, Probability distribution, Limit (mathematics), Statistical physics, 0101 mathematics, Statistics, Probability and Uncertainty, Mathematics

Abstract

Zipf's laws are probability distributions on the positive integers which decay algebraically. Such laws have been shown empirically to describe a large class of phenomena, including frequency of words usage, populations of cities, distributions of personal incomes, and distributions of biological genera and species, to mention only a few. In this paper we present a Dirichlet–multinomial urn model for describing the above phenomena from a stochastic point of view. We derive the Zipf's law under certain regularity conditions; some limit theorems are also obtained for the urn model under consideration.

Published

1980

2. Limit theorems for general size distributions

Author

Wen-Chen Chen

Subjects

Independent and identically distributed random variables, Statistics and Probability, Multivariate random variable, General Mathematics, 010102 general mathematics, Conditional probability distribution, 01 natural sciences, Combinatorics, 010104 statistics & probability, Distribution (mathematics), Pólya urn model, Limit (mathematics), 0101 mathematics, Statistics, Probability and Uncertainty, Random variable, Central limit theorem, Mathematics

Abstract

Let X 1, X 2, · ··, Xn , · ·· be independent and identically distributed non-negative integer-valued random variables with finite mean and variance. For any positive integer n and m we consider the random vector i.e., L has the same distribution as the conditional distribution of (X 1, · ··, Xm ) given the condition It is easy to see that our model includes the classical urn model, the Bose–Einstein urn model and the Pólya urn model as special cases. For any non-negative integer s define G(s) = the number of Li′s such that Li = s, and U = the number of Li′s such that Li is an even number; in this paper we study the asymptotic behaviour of the random variables considered above. Some central limit theorems and a multinormal local limit theorem are proved.

Published

1981