The Transitive Minimum Manhattan Subnetwork Problem in 3 dimensions

We consider the Minimum Manhattan Subnetwork (MMSN) Problem which generalizes the already known Minimum Manhattan Network (MMN) Problem: Given a set PP of nn points in the plane, find shortest rectilinear paths between all pairs of points. These paths form a network, the total length of which has to be minimized. From a graph theoretical point of view, a MMN is a 1-spanner with respect to the L1L1 metric. In contrast to the MMN problem, a solution to the MMSN problem does not demand L1L1-shortest paths for all point pairs, but only for a given set R⊆P×PR⊆P×P of pairs. The complexity status of the MMN problem is still unsolved in ≥2 dimensions, whereas the MMSN was shown to be NPNP-complete considering general relations RR in the plane. We restrict the MMSN problem to transitive relations RTRT (Transitive   Minimum Manhattan Subnetwork (TMMSN) Problem) and show that the TMMSN problem in 3 dimensions is NPNP-complete.