Representative product systems

Abstract

The Walsh-Paley system is formed by the characters of the dyadic group, i.e., the complete product of the discrete cyclic group of order 2 with the product of topologies and measures. Vilenkin in 1947 generalized this structure studying the complete product of arbitrary cyclic groups. In Vilenkin groups the order of the cyclic groups appeared in the product can be unbounded. The methods applied in the study of these cases differ significantly from the bounded cases and in many instances we obtain different results for the same question. A natural generalization of the Vilenkin groups is the complete product of arbitrary groups, non necessarily commutative groups. In this case we use representation theory in order to obtain orthonormal systems, taking the finite product of the normalized coordinate functions of the continuous irreducible representations appeared in the dual object of the finite groups. These systems are named representative product systems.

In this talk I deal with the convergence in $L^p$-norm of Fourier series, Fej\'er means and Ces\`aro means of order $\alpha$ with respect to representative product systems, where $1\le p<\infty$. I also deal with the properties of the maximal values of Dirichlet kernels emphasizing the differences between commutative and noncommutative structures.