Abstract
FOURTH EUROPEAN CONGRESS OF MATHEMATICS STOCKHOLM,SWEDEN
JUNE27 - JULY 2, 2004 Contributed papers
L. Carleson’s celebrated theorem of 1965 [1] asserts the pointwise convergence of the
partial Fourier sums of square integrable functions. The Fourier transform has a
formulation on each of the Euclidean groups R , Z and Τ .Carleson’s original proof worked
on Τ . Fefferman’s proof translates very easily to R . M´at´e [2] extended Carleson’s proof
to Z . Each of the statements of the theorem can be stated in terms of a maximal Fourier
multiplier theorem [5]. Inequalities for such operators can be transferred between these
three Euclidean groups, and was done P. Auscher and M.J. Carro [3]. But L. Carleson’s
original proof and another proofs very long and very complicated. We give a very short
and very “simple” proof of this fact. Our proof uses PNSA technique only, developed in
part I, and does not uses complicated technical formations unavoidable by the using of
purely standard approach to the present problems. In contradiction to Carleson’s method,
which is based on profound properties of trigonometric series, the proposed approach is
quite general and allows to research a wide class of analogous problems for the general
orthogonal series.