Title :
Composition for multivariate random variables
Author :
Hill, Raymond R. ; Reilly, Charles H.
Author_Institution :
AFSAA/SAGW, Pentagon, Washington, DC, USA
Abstract :
We show how to find mixing probabilities, or weights, for composite probability mass functions (pmfs) for k-variate discrete random variables with specified marginal pmfs and a specified, feasible population correlation structure. We characterize a joint pmf that is a composition, or mixture, of 2k-1 extreme correlation joint pmfs and the joint pmf under independence. Our composition method is also valid for multivariate continuous random variables. We consider the cases where all of the marginal distributions are discrete uniform, negative exponential, or continuous uniform.
Keywords :
optimisation; probability; composite probability mass functions; continuous uniform; discrete uniform; extreme correlation joint pmfs; feasible population correlation structure; k-variate discrete random variables; marginal distributions; multivariate continuous random variables; multivariate random variables; negative exponential; optimisation; probabilities; specified marginal pmfs; weights; Distributed computing; Industrial relations; Manufacturing systems; Modeling; Optimization methods; Random variables; Systems engineering and theory; Welding;
Conference_Titel :
Simulation Conference Proceedings, 1994. Winter
Print_ISBN :
0-7803-2109-X
DOI :
10.1109/WSC.1994.717172
