On the weighted safe set problem on paths and cycles

TL;DR

This paper investigates the properties of weighted safe sets in paths and cycles, exploring conditions for equality of weighted safe numbers and addressing a related problem on subgraph component polynomials.

Contribution

It characterizes when the weighted safe number equals the connected weighted safe number for paths and cycles, and solves a problem on subgraph component polynomials for these graphs.

Findings

Conditions for equality of s(G,w) and cs(G,w) on paths and cycles

Characterization of weighted safe sets in specific graph classes

Solution to the subgraph component polynomial problem for cycles

Abstract

Let $G$ be a graph, and let $w: V(G) \to \mathbb{R}$ be a weight function on the vertices of $G$. For every subset $X$ of $V(G)$, let $w(X)=\sum_{v \in X} w(v).$ A non-empty subset $S \subset V(G)$ is a weighted safe set of $(G,w)$ if, for every component $C$ of the subgraph induced by $S$ and every component $D$ of $G-S$, we have $w(C) \geq w(D)$ whenever there is an edge between $C$ and $D$. If the subgraph of $G$ induced by a weighted safe set $S$ is connected, then the set $S$ is called a connected weighted safe set of $(G,w)$. The weighted safe number $s(G,w)$ and connected weighted safe number $cs(G,w)$ of $(G,w)$ are the minimum weights $w(S)$ among all weighted safe sets and all connected weighted safe sets of $(G,w)$, respectively. It is easy to see that for any pair $(G,w)$, ${s}(G,w) \le {cs}(G,w)$ by their definitions. In this paper, we discuss the possible equality when $G$ is a path or a cycle. We also give an answer to a problem due to Tittmann et al. [Eur. J. Combin. Vol. 32 (2011)] concerning subgraph component polynomials for cycles and complete graphs.