Realisations of posets and tameness

We introduce a construction called realisation which transforms posets into posets. We show that realisations share several key features with upper semilattices which are essential in persistence. For example, we define local dimensions of points in a poset and show that these numbers for realisations behave in a similar way as they do for upper semilattices. Furthermore, similarly to upper semilattices, realisations have well behaved discrete approximations which are suitable for capturing homological properties of functors indexed by them. These discretisations are convenient and effective for describing tameness of functors. Homotopical and homological properties of tame functors, particularly those indexed by realisations, are discussed.