Characterizing hierarchically hyperbolic free by cyclic groups

We algebraically characterize free by cyclic groups that have coarse medians, and prove that this is equivalent to the a priori stronger properties of being colourable hierarchically hyperbolic groups and being quasi-isometric to CAT(0) cube complexes. Our algebraic characterization involves a condition on intersections between maximal virtually $F_n\times \mathbb Z$ subgroups that we call having \emph{unbranched blocks}. We also characterize hierarchical hyperbolicity of $Γ=F_n\rtimes_ϕ\mathbb Z$ in terms of a property of completely split relative train track representatives of $ϕ\in\mathrm{Out}(F_n)$ that we call \emph{excessive linearity}, a slight refinement of the \emph{rich linearity} condition for relative train track maps introduced by Munro and Petyt.