Broadcast independence and packing in certain classes of trees

TL;DR

This paper investigates optimal broadcast functions in specific tree classes, focusing on independence and packing constraints, and provides maximum weight solutions for perfect k-ary trees, spiders, and double spiders.

Contribution

It offers new results on maximum weight independent and packing broadcasts in certain classes of trees, addressing a question by Ahmane et al.

Findings

Maximum weight independent broadcasts in perfect k-ary trees

Maximum weight packing broadcasts in spiders and double spiders

Partial solutions to a problem posed by Ahmane et al.

Abstract

Given a graph $G=(V,E)$ of diameter $d$, a broadcast is a function $f:V(G) \to \{ 0, 1, \dots, d \}$ where $f(v)$ is at most the eccentricity of $v$. A vertex $v$ is broadcasting if $f(v)>0$ and a vertex $u$ hears $v$ if $d(u,v) \leq f(v)$. A broadcast is independent if no broadcasting vertex hears another vertex and is a packing if no vertex hears more than one vertex. The weight of $f$ is $\sum_{v \in V} f(v)$. We find the maximum weight independent and packing broadcasts for perfect $k$-ary trees, spiders, and double spiders as a partial answer to a question posed by Ahmane et al.