Characterization of the geometric and exponential random variables
Journal article, 2004
Let the random variable X be distributed over the non-negative integers and let Lm and Rm be the quotient and the remainder in the division of X by m. It is shown that X is geometric if and only if Lm and Rm are independent for m=2,3, . . . . In similar terms is also characterized the exponential random variable.
Exponential distribution
Geometric distribution
Characterization.
Author
Rossitza Dodunekova
University of Gothenburg
Chalmers, Department of Mathematical Statistics
Communications in Statistics, Part A: Theory and Methods
Vol. 33 8 1755-1765
Subject Categories
Other Mathematics