Stability of trigonometric approximation in Lp and applications to prediction theory

Abstract

Let be an LCA group and (μn) be a sequence of bounded regular Borel measures on tending to a measure μ0. Let G be the dual group of , S be a non-empty subset of G \ 0 \, and [ T(S)]μn,p the subspace of Lp(μn), p ∈ (0,∞), spanned by the characters of which are generated by the elements of S. The limit behaviour of the sequence of metric projections of the function 1 onto [ T(S)]μn,p as well as of the sequence of the corresponding approximation errors are studied. The results are applied to obtain stability theorems for prediction of weakly stationary or harmonizable symmetric p-stable stochastic processes. Along with the general problem the particular cases of linear interpolation or extrapolation as well as of a finite or periodic observation set are studied in detail and compared to each other.