Distal actions and shifted convolution property
C. R. E. Raja, R. Shah
Abstract
A locally compact group $G$ is said to have shifted convolution property (abbr. as SCP) if for every regular Borel probability measure $μ$ on $G$, either $\sup_{x\in G} μ^n (Cx) \ra 0$ for all compact subsets $C$ of $G$, or there exist $x\in G$ and a compact subgroup $K$ normalised by $x$ such that $μ^nx^{-n} \ra ω_K$, the Haar measure on $K$. We first consider distality of factor actions of distal actions. It is shown that this holds in particular for factors under compact groups invariant under the action and for factors under the connected component of identity. We then characterize groups having SCP in terms of a readily verifiable condition on the conjugation action (point-wise distality). This has some interesting corollaries to distality of certain actions and Choquet Deny measures which actually motivated SCP and point-wise distal groups. We also relate distality of actions on groups to that of the extensions on the space of probability measures.