Distance problems within Helly graphs and $k$-Helly graphs
Abstract
The ball hypergraph of a graph is the family of balls of all possible centers and radii in . It has Helly number at most if every subfamily of -wise intersecting balls has a nonempty common intersection. A graph is -Helly (or Helly, if ) if its ball hypergraph has Helly number at most . We prove that a central vertex and all the medians in an -vertex -edge Helly graph can be computed w.h.p. in time. Both results extend to a broader setting where we define a non-negative cost function over the vertex-set. For any fixed , we also present an -time randomized algorithm for radius computation within -Helly graphs. If we relax the definition of Helly number (for what is sometimes called an "almost Helly-type" property in the literature), then our approach leads to an approximation algorithm for computing the radius with an additive one-sided error of at most some constant.
Cite
@article{arxiv.2011.00001,
title = {Distance problems within Helly graphs and $k$-Helly graphs},
author = {Guillaume Ducoffe},
journal= {arXiv preprint arXiv:2011.00001},
year = {2020}
}