On the summability of Random Fourier--Jacobi Series

Abstract

This article is a study on the summability of random Fourier--Jacobi series of some functions in different spaces. We consider the random series Σn=0∞ anAn(ω)pn(γ,δ)(y), where pn(γ,δ)(y),γ,δ>-1 are orthonormal Jacobi polynomials, the scalars an are Fourier--Jacobi coefficients of a function f and the random variables An(ω) are Fourier--Jacobi coefficients of the symmetric stable process X(t,ω) of index α ∈ [1,2]. It is established that the random Fourier--Jacobi series is --summable in probability, if an are the Fourier--Jacobi coefficients of function f in the space C[-1,1](η,τ). The Ces\'aro (C,φ),φ ≥1 summability of random Fourier--Jacobi series is shown, for the symmetric stable process X(t,ω) of index α ∈ [1,2] under different conditions on the parameters γ,δ,η and τ. The other cases of summability, such as Riesz, Rogosinski, etc., are also discussed. Further, the N\"orlund summability, generalized N\"orlund summability, and lower triangular summability of random Fourier--Jacobi series are proved if an are the Fourier--Jacobi coefficients of a function f ∈ L[-1,1]1,(γ,δ), and An(ω) are associated with the symmetric stable process X(t,ω) of index one. It is observed that the conditions on the parameters γ,δ differ from that of the conditions on γ,δ for the Fourier--Jacobi series of functions f in L[-1,1]1,(γ,δ).