Local properties of factored Fourier series (Q1026263)

The author studies the following result: If \((\lambda_{n})\) is a convex sequence such that \(\sum p_{n}\lambda_{n}\) is convergent, then the summability \(|N,p_{n}|_{k}\) of the series \(\sum A_{n}(t)\lambda_{n}p_{n}\) at a point is a local property of the generating function \(f(t)\). He generalizes this result for \(|N,p_{n},\theta_{n}|_{k}\) summability. Also, some new results are given.