# Gathering in Dynamic Rings

**Authors:** Giuseppe Antonio Di Luna, Paola Flocchini, Linda Pagli, Giuseppe, Prencipe, Nicola Santoro, Giovanni Viglietta

arXiv: 1704.02427 · 2017-04-12

## TL;DR

This paper investigates the problem of gathering mobile agents in dynamic rings with changing topology, analyzing how factors like chirality and cross detection influence the solvability and providing optimal algorithms for certain conditions.

## Contribution

It offers a complete characterization of initial configurations allowing gathering in dynamic rings, considering the effects of chirality and cross detection, with constructive, time-optimal algorithms.

## Key findings

- Gathering is solvable in specific initial configurations with cross detection.
- Cross detection enhances computational power and algorithm efficiency.
- Knowledge of ring size can substitute for knowing the number of agents depending on chirality.

## Abstract

The gathering problem requires a set of mobile agents, arbitrarily positioned at different nodes of a network to group within finite time at the same location, not fixed in advanced.   The extensive existing literature on this problem shares the same fundamental assumption: the topological structure does not change during the rendezvous or the gathering; this is true also for those investigations that consider faulty nodes. In other words, they only consider static graphs. In this paper we start the investigation of gathering in dynamic graphs, that is networks where the topology changes continuously and at unpredictable locations.   We study the feasibility of gathering mobile agents, identical and without explicit communication capabilities, in a dynamic ring of anonymous nodes; the class of dynamics we consider is the classic 1-interval-connectivity.   We focus on the impact that factors such as chirality (i.e., a common sense of orientation) and cross detection (i.e., the ability to detect, when traversing an edge, whether some agent is traversing it in the other direction), have on the solvability of the problem. We provide a complete characterization of the classes of initial configurations from which the gathering problem is solvable in presence and in absence of cross detection and of chirality. The feasibility results of the characterization are all constructive: we provide distributed algorithms that allow the agents to gather. In particular, the protocols for gathering with cross detection are time optimal. We also show that cross detection is a powerful computational element.   We prove that, without chirality, knowledge of the ring size is strictly more powerful than knowledge of the number of agents; on the other hand, with chirality, knowledge of n can be substituted by knowledge of k, yielding the same classes of feasible initial configurations.

## Full text

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## Figures

7 figures with captions in the complete paper: https://tomesphere.com/paper/1704.02427/full.md

## References

47 references — full list in the complete paper: https://tomesphere.com/paper/1704.02427/full.md

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Source: https://tomesphere.com/paper/1704.02427