Restricted summability of Fourier transforms and local Hardy spaces

## Abstract A general summability method is considered for functions from Herz spaces __K__^α^~__p,r__~ (ℝ^__d__^ ). The boundedness of the Hardy–Littlewood maximal operator on Herz spaces is proved in some critical cases. This implies that the maximal operator of the __θ__ ‐means __σ__^__θ__^ ~__

We consider the Riemann means of single and multiple Fourier integrals of functions belonging to L 1 or the real Hardy spaces defined on IR n , where n ≥ 1 is an integer. We prove that the maximal Riemann operator is bounded both from H 1 (IR) into L 1 (IR) and from L 1 (IR) into weak -L 1 (IR). We

In this paper we intend to prove weak type estimates for maximal functions related to a.e. summability of FOURIER integrals in the spaces Ifp( R N ) where O -= p ~l and N>1. ## Let ( 1 ) &!?(z)=(2n)-" f (1-(& -lyIJ2): $f(y) eiz%zg, &>O , RN be the MARCINKIEWICZ-RIESZ means of order 6zO of the fun

Let O O be the ring of integers in a local field K. We solve an open problem due Ž to M. H. Taibleson 1975, ''Math. Notes,'' Vol. 15, Princeton Univ. Press, Prince-. 1 Ž . ton, NJ : Suppose f g L O O . Does the Cesaro means of f converge to f almost `Ž p p . everywhere if K has characteristic zero?