A faster algorithm for the discrete Fr\'echet distance under translation

Abstract

The discrete Fr\'echet distance is a useful similarity measure for comparing two sequences of points P=(p1,…, pm) and Q=(q1,…,qn). In many applications, the quality of the matching can be improved if we let Q undergo some transformation relative to P. In this paper we consider the problem of finding a translation of Q that brings the discrete Fr\'echet distance between P and Q to a minimum. We devise an algorithm that computes the minimum discrete Fr\'echet distance under translation in R2, and runs in O(m3n2(1+(n/m))(m+n)) time, assuming m≤ n. This improves a previous algorithm of Jiang et al.~JXZ08, which runs in O(m3n3 (m + n)) time.