Coarse spaces, ultrafilters and dynamical systems

Abstract: For a coarse space $(X, \mathcal{E})$, $X^\sharp$ denotes the set of all unbounded ultrafilters on $X$ endowed with the parallelity relation: $p||q$ if there exists $E \in \mathcal{E} $ such that $ E[P]\in q $ for each $P\in p$. If $(X, \mathcal{E})$ is finitary then there exists a group $G $ of permutations of $X$ such that the coarse structure $\mathcal{E}$ has the base ${{ (x,gx): x\in X$, $g\in F}: F\in [G]^{<\omega}, \ id \in F }.$ We survey and analyze interplays between $(X, \mathcal{E})$, $X^\sharp$ and the dynamical system $(G, X^\sharp)$.