English

Approximating Connected Safe Sets in Weighted Trees

Combinatorics 2017-12-05 v2 Discrete Mathematics

Abstract

For a graph GG and a non-negative integral weight function ww on the vertex set of GG, a set SS of vertices of GG is ww-safe if w(C)w(D)w(C)\geq w(D) for every component CC of the subgraph of GG induced by SS and every component DD of the subgraph of GG induced by the complement of SS such that some vertex in CC is adjacent to some vertex of DD. The minimum weight w(S)w(S) of a ww-safe set SS is the safe number s(G,w)s(G,w) of the weighted graph (G,w)(G,w), and the minimum weight of a ww-safe set that induces a connected subgraph of GG is its connected safe number cs(G,w)cs(G,w). Bapat et al. showed that computing cs(G,w)cs(G,w) is NP-hard even when GG is a star. For a given weighted tree (T,w)(T,w), they described an efficient 22-approximation algorithm for cs(T,w)cs(T,w) as well as an efficient 44-approximation algorithm for s(T,w)s(T,w). Addressing a problem they posed, we present a PTAS for the connected safe number of a weighted tree. Our PTAS partly relies on an exact pseudopolynomial time algorithm, which also allows to derive an asymptotic FPTAS for restricted instances. Finally, we extend a bound due to Fujita et al. from trees to block graphs.

Keywords

Cite

@article{arxiv.1711.11412,
  title  = {Approximating Connected Safe Sets in Weighted Trees},
  author = {Stefan Ehard and Dieter Rautenbach},
  journal= {arXiv preprint arXiv:1711.11412},
  year   = {2017}
}
R2 v1 2026-06-22T23:02:25.957Z