Accession Number : ADA135314

Title :   Convergence of Quadratic Forms in p-Stable Random Variables and Theta sub p-Radonifying Operators.

Descriptive Note : Technical rept.,

Corporate Author : NORTH CAROLINA UNIV AT CHAPEL HILL DEPT OF STATISTICS

Personal Author(s) : Cambanis,S ; Rosinski,J ; Woyczynski,W A

PDF Url : ADA135314

Report Date : Oct 1983

Pagination or Media Count : 22

Abstract : Necessary and sufficient conditions are given for the almost sure convergence of a quadratic form where (M sub j) is a sequence of i.i.d. p-stable random variables. A connection is established between the convergence of the quadratic form and a radonifying property of the infinite matrix operator (f sub kj). (Author)

Descriptors :   *Numerical quadrature, *Convergence, Random variables, Operators(Mathematics), Radon, Matrices(Mathematics), Sequences(Mathematics)

Subject Categories : Theoretical Mathematics

Distribution Statement : APPROVED FOR PUBLIC RELEASE