English

Parametric Shortest Paths in a Linearly Interpolated Graph

Computational Geometry 2026-04-13 v1

Abstract

We consider the parametric shortest paths problem in a linearly interpolated graph. Given two positively-weighted directed graphs G0=(V,E,ω0)G_0=(V,E,\omega_0) and G1=(V,E,ω1),G_1=(V,E,\omega_1), the linearly interpolated graph is the family of graphs (1λ)G0+λG1(1-\lambda)G_0+\lambda G_1, parameterized by λ[0,1]\lambda\in [0,1]. The problem is to compute all distinct parametric shortest paths. We compute a data structure in Θ(kElogV)\Theta(k|E|\log |V|) time, where~kk is the number of distinct parametric shortest paths over all~λ[0,1]\lambda\in [0,1] that exist for a nontrivial interval of parameters, each corresponding to a linear function in a maximal sub-interval of [0,1][0,1]. Using this data structure, a shortest path query takes~Θ(logk)\Theta(\log k) time.

Keywords

Cite

@article{arxiv.2604.08892,
  title  = {Parametric Shortest Paths in a Linearly Interpolated Graph},
  author = {Jacob Sriraman and Eli Barton and Brittany Terese Fasy and David L. Millman and Brendan Mumey and Nate Rengo and Braeden Sopp and Vasishta Tumuluri and Binhai Zhu},
  journal= {arXiv preprint arXiv:2604.08892},
  year   = {2026}
}

Comments

7 pages, 2 figures. Accepted to SOCG:YRF 2026

R2 v1 2026-07-01T12:02:17.589Z