On the Convergence of Random Fourier--Jacobi Series in weighted L[-1,1]p,(ζ,η) Space

Abstract

In the present paper, the random series Σm=0∞ cm Cm()qm(ζ,η)(u) in orthogonal Jacobi polynomials qm(ζ,η)(u) is discussed. The scalars cm are Fourier--Jacobi coefficients of a function in the weighted space L[-1,1]p(dμζ,η),p>1. The random variables Cm() are chosen to be the Fourier--Jacobi coefficients of symmetric stable process Yζ,η(v,) of index ∈ [1,2] for ζ,η ≥ 0, which are not independent. We prove that, under certain conditions on p,ζ and η, the random Fourier--Jacobi series converges in probability to the stochastic integral equation* ∫-11 g(u,v)dYζ,η(v,). equation* We also establish the existence of this integral in the sense of probability for g ∈ L[-1,1]p(dμζ,η).