Haar Invariant Sets and Compact Transformation Groups

We determine all locally compact imprimitive transformation groups acting sharply 2-transitively on a nontotally disconnected quotient space of blocks inducing on any block a sharply 2-transitive group and satisfying the following condition: if Δ1, Δ2 are two distinct blocks and Pi, Qi ∈ Δi (i = 1,

This paper is devoted to an investigation of various dynamical concepts for group shift systems which are invariant by algebraic conjugacy (i.e., topological conjugacy preserving the group structure). The concept of controllability, which is stronger than topological transitivity, and the concept of

For a finite group G and a set Z c ( 1,2,..., n) let e,h 1) = C h(g) 0 et(g) 63 a.. 0 e,(g), SEG where G?) = g if i E I, a?) = 1 if i&Z. We prove, among other results, that the positive integers tr(e,(n, I, ) + ... + e,(n, I,))': n, r, k) 1, Zjz { l,..., n), 1 < II,1 < 3 for 1 1 and a set Z s { 1,2

Using Fourier transformation, the g e n e r A g elements of Hilbert C\*-systems are calculated. Their matrix elements coincide essentjdly with the coefficients of their multiplication schema.

## Abstract Let __G__ be an abelian topological group. The symbol \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\widehat{G}$\end{document} denotes the group of all continuous characters \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\chi

Let \(\mu\) be an invariant measure on a regular orbit in a compact Lie group or in a Lie algebra. We prove sharp \(L^{\prime \prime}-L^{4}\) estimates for the convolution operators defined through \(\mu\). We also obtain similar results for the related Radon transform on the Lie algebra. 1945 Acade