English

Filling MIS Vertices by Myopic Luminous Robots

Distributed, Parallel, and Cluster Computing 2022-10-18 v2

Abstract

We present the problem of finding a maximal independent set (MIS) (named as \emph{MIS Filling problem}) of an arbitrary connected graph having nn vertices with luminous myopic mobile robots. The robots enter the graph one after another from a particular vertex called the \emph{Door} and disperse along the edges of the graph without collision to occupy vertices such that the set of vertices occupied by the robots is a maximal independent set. We assume the robots have knowledge only about the maximum degree of the graph, denoted by Δ\Delta. In this paper, we explore two versions of the problem: the solution to the first version, named as \emph{MIS Filling with Single Door}, works under an asynchronous scheduler using robots with 3 hops of visibility range, Δ+6\Delta + 6 number of colors and O(logΔ)O(\log \Delta) bits of persistent storage. The time complexity is measured in terms of epochs and it can be solved in O(n2)O(n^2) epochs. An epoch is the smallest time interval in which each participating robot gets activated and executes the algorithm at least once. For the second version with k (>1)k~ ( > 1) \textit{Doors}, named as \emph{MIS Filling with Multiple Doors}, the solution works under a semi-synchronous scheduler using robots with 5 hops of visibility range, Δ+k+6\Delta + k + 6 number of colors and O(log(Δ+k))O(\log (\Delta + k)) bits of persistent storage. The problem with multiple Doors can be solved in O(n2)O(n^2) epochs.

Keywords

Cite

@article{arxiv.2107.04885,
  title  = {Filling MIS Vertices by Myopic Luminous Robots},
  author = {Subhajit Pramanick and Sai Vamshi Samala and Debasish Pattanayak and Partha Sarathi Mandal},
  journal= {arXiv preprint arXiv:2107.04885},
  year   = {2022}
}

Comments

A version of this paper appears in the Proceedings of ICDCIT'23

R2 v1 2026-06-24T04:04:14.617Z