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Metric Approximations of Consistent Path Systems

Published 29 Jan 2026 in math.CO | (2601.21982v1)

Abstract: A path system $\mathscr{P}$ in a graph $G=(V,E)$ is a collection of paths, with exactly one path between any two vertices in $V$. A path system is said to be consistent if it is closed under subpaths. We say that a path system $\mathscr{P}$ is $α$-metric if there exists a metric $ρ$ on $V$ such that $\sum_{i=1}{k}ρ(x_{i-1},x_{i}) \le αρ(x_0,x_k)$ for every path $(x_0,x_1,\dots,x_k)\in \mathscr{P}$. Also, we denote by $Δ(\mathscr{P})$ the infimum of $α$ for which $\mathscr{P}$ is $α$-metric. We construct here infinitely many $n$-point consistent path systems $\mathscr{P}_n$ with $Δ(\mathscr{P}_n) \ge n{\frac{1}{2}-o(1)}$. We also show how to efficiently compute $Δ(\mathscr{P})$ for a given path system.

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