Abstract
A Manhattan network for a finite set P of points in the plane is a geometric graph such that its vertex set contains P , its edges are axis-parallel and non-crossing and, for any two points p and q in P , there exists a path in the network connecting p and q whose length equals the l 1 -distance between p and q . The problem of computing a Manhattan network of minimum total edge length for a given point set P has recently been shown to be NP-hard. In this note, using as the parameter the minimum number h of horizontal straight lines that contain the points in P , we present a fixed-parameter algorithm for this problem running in O * (2 14 h ) time and note that, under the exponential time hypothesis for 3-SAT, a run time that is subexponential in h is impossible.
Sign-in/Register to access full text options 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
