Tautness for sets of multiples and applications to $\mathcal B$-free dynamics

Abstract: For any set $\mathcal B\subseteq\mathbb N={1,2,\dots}$ one can define its \emph{set of multiples} $\mathcal M_{\mathcal B}:=\bigcup_{b\in\mathcal B}b\mathbb Z$ and the set of \emph{$\mathcal B$-free numbers} $\mathcal F_{\mathcal B}:=\mathbb Z\setminus\mathcal M_{\mathcal B}$. Tautness of the set $\mathcal B$ is a basic property related to questions around the asymptotic density of $\mathcal M_{\mathcal B}\subseteq\mathbb Z$. From a dynamical systems point of view (originated by Sarnak) one studies $\eta$, the indicator function of $\mathcal F_{\mathcal B}\subseteq\mathbb Z$, its shift-orbit closure $X_\eta\subseteq{0,1}^{\mathbb Z}$ and the stationary probability measure $\nu_\eta$ defined on $X_\eta$ by the frequencies of finite blocks in $\eta$. In this paper we prove that tautness implies the following two properties of $\eta$: (1) The measure $\nu_\eta$ has full topological support in $X_\eta$. (2) If $X_\eta$ is proximal, i.e. if the one-point set ${\dots000\dots}$ is contained in $X_\eta$ and is the unique minimal subset of $X_\eta$, then $X_\eta$ is hereditary, i.e. if $x\in X_\eta$ and if $w$ is an arbitrary element of ${0,1}^{\mathbb Z}$, then also the coordinate-wise product $w\cdot x$ belongs to $X_\eta$. This strengthens two results from [Bartnicka et al. 2015] which need the stronger assumption that $\mathcal B$ has light tails for the same conclusions.