English

Successive shortest paths in complete graphs with random edge weights

Combinatorics 2020-10-13 v2 Discrete Mathematics Probability

Abstract

Consider a complete graph KnK_n with edge weights drawn independently from a uniform distribution U(0,1)U(0,1). The weight of the shortest (minimum-weight) path P1P_1 between two given vertices is known to be lnn/n\ln n / n, asymptotically. Define a second-shortest path P2P_2 to be the shortest path edge-disjoint from P1P_1, and consider more generally the shortest path PkP_k edge-disjoint from all earlier paths. We show that the cost XkX_k of PkP_k converges in probability to 2k/n+lnn/n2k/n+\ln n/n uniformly for all kn1k \leq n-1. We show analogous results when the edge weights are drawn from an exponential distribution. The same results characterise the collectively cheapest kk edge-disjoint paths, i.e., a minimum-cost kk-flow. We also obtain the expectation of XkX_k conditioned on the existence of PkP_k.

Keywords

Cite

@article{arxiv.1911.01151,
  title  = {Successive shortest paths in complete graphs with random edge weights},
  author = {Stefanie Gerke and Balázs F. Mezei and Gregory B. Sorkin},
  journal= {arXiv preprint arXiv:1911.01151},
  year   = {2020}
}
R2 v1 2026-06-23T12:03:54.523Z