Shortest path queries in rectilinear worlds

Abstract In this paper, a data structure is given for two and higher dimensional shortest path queries. For a set of n axis-parallel rectangles in the plane, or boxes in d-space, and a fixed target, it is possible with this structure to find a shortest rectilinear path avoiding all rectangles or boxes from any point to this target. Alternatively, it is possible to find the length of the path. The metric considered is a generalization of the Ll-metric and the link metric, where the length of a path is its L1-Iength plus some (fixed) constant times the number of turns on the path. The data structure has size 0« n log n )d-l), and a query takes O(logd-l n) time (plus the output size if the path must be reported). As a byproduct, a relatively simple solution to the single shot problem is obtained; the shortest path between two given points can be computed in time O(ndlogn) for d ~ 3, and in time 0(n 2 ) in the plane

Finding shortest paths in the presence of orthogonal obstacles using a combined L_1 and link metric

The problem of computing shortest paths in obstacle environments has received considerable attention recently. We study this problem for a new metric that generalizes the metric and the link metric. In this combined metric, the length of a path is defined as its length plus some non-negative constant C times the number of turns the path makes. Given an environment of n axis parallel..