Computing the Fr\'echet Distance When Just One Curve is $c$-Packed: A Simple Almost-Tight Algorithm

TL;DR

This paper presents a simple, efficient algorithm for approximating the Fréchet distance between two curves when only one is c-packed, improving previous methods in simplicity and computational complexity.

Contribution

The authors introduce a straightforward algorithm that achieves a near-optimal approximation of the Fréchet distance with better dependencies on parameters, without prior knowledge of c or which curve is c-packed.

Findings

Achieves a $(1+ ext{ε})$-approximation in $O(d imes c imes rac{n+m}{ ext{ε}} imes ext{log}rac{n+m}{ ext{ε}})$ time.

Simplifies previous algorithms while significantly improving parameter dependencies.

Nearly matches the asymptotic bounds for the case when both curves are c-packed.

Abstract

We study approximating the continuous Fr\'echet distance of two curves with complexity $n$ and $m$, under the assumption that only one of the two curves is $c$-packed. Driemel, Har{-}Peled and Wenk DCG'12 studied Fr\'echet distance approximations under the assumption that both curves are $c$-packed. In $\mathbb{R}^d$, they prove a $(1+\varepsilon)$-approximation in $\tilde{O}(d \, c\,\frac{n+m}{\varepsilon})$ time. Bringmann and K\"unnemann IJCGA'17 improved this to $\tilde{O}(c\,\frac{n + m }{\sqrt{\varepsilon}})$ time, which they showed is near-tight under SETH. Recently, Gudmundsson, Mai, and Wong ISAAC'24 studied our setting where only one of the curves is $c$-packed. They provide an involved $\tilde{O}( d \cdot (c+\varepsilon^{-1})(cn\varepsilon^{-2} + c^2m\varepsilon^{-7} + \varepsilon^{-2d-1}))$-time algorithm when the $c$-packed curve has $n$ vertices and the arbitrary curve has $m$, where $d$ is the dimension in Euclidean space. In this paper, we show a simple technique to compute a $(1+\varepsilon)$-approximation in $\mathbb{R}^d$ in time $O(d \cdot c\,\frac{n+m}{\varepsilon}\log\frac{n+m}{\varepsilon})$ when one of the curves is $c$-packed. Our approach is not only simpler than previous work, but also significantly improves the dependencies on $c$, $\varepsilon$, and $d$. Moreover, it almost matches the asymptotically tight bound for when both curves are $c$-packed. Our algorithm is robust in the sense that it does not require knowledge of $c$, nor information about which of the two input curves is $c$-packed.