Closed curve covering and multiagent TSP ratios

Abstract

How efficiently can a closed curve of unit length in Rd be covered by k closed curves so as to minimize the maximum length of the k curves? We show that the maximum length is at most 2k-1 - 14 k-4 for all k≥ 2 and d ≥ 2. As a first byproduct, we show that k agents can traverse a Euclidean TSP instance significantly faster than a single agent. We thereby sharpen recent planar results by Berendsohn, Kim, and Kozma (2025) and extend these improvements to all dimensions. As a second byproduct, we obtain a linear time approximation algorithm with ratio 2 - 14 k-3 for covering any closed polygonal curve in Rd by k closed curves so that the maximum length of an individual curve is minimized.