Free coarse groups

Abstract: A coarse group is a group endowed with a coarse structure so that the group multiplication and inversion are coarse mappings. Let $(X, \mathcal{E})$ be a coarse space and let $\mathfrak{M}$ be a variety of groups different from the variety of singletons. We prove that there is a coarse group $F_{\mathfrak{M}} (X, \mathcal{E})\in \mathfrak{M}$ such that $(X, \mathcal{E}) $ is a subspace of $F_{\mathfrak{M}} (X, \mathcal{E})$, $X$ generates $F_{\mathfrak{M}} (X, \mathcal{E})$ and every coarse mapping $(X, \mathcal{E}) \longrightarrow (G, \mathcal{E}^{\prime}) $ where $G\in\mathfrak{M}$, $(G, \mathcal{E}^{\prime}) $ is a coarse group, can be extended to coarse homomorphism $F_{\mathfrak{M}} (X, \mathcal{E})\longrightarrow (G, \mathcal{E}^{\prime}) $. If $\mathfrak{M}$ is the variety of all groups, the groups $F_{\mathfrak{M}} (X, \mathcal{E})$ are asymptotic counterparts of Markov free topological groups over Tikhonov spaces.