Computing a Subtrajectory Cluster from c-packed Trajectories

Abstract

We present a near-linear time approximation algorithm for the subtrajectory cluster problem of c-packed trajectories. The problem involves finding m subtrajectories within a given trajectory T such that their Fr\'echet distances are at most (1 + )d, and at least one subtrajectory must be of length~l or longer. A trajectory T is c-packed if the intersection of T and any ball B with radius r is at most c · r in length. Previous results by Gudmundsson and Wong GudmundssonWong2022Cubicupperlower established an (n3) lower bound unless the Strong Exponential Time Hypothesis fails, and they presented an O(n3 2 n) time algorithm. We circumvent this conditional lower bound by studying subtrajectory cluster on c-packed trajectories, resulting in an algorithm with an O((c2 n/2)(c/)(n/)) time complexity.