Polynomial Silent Self-Stabilizing p-Star Decomposition
نویسندگان
چکیده
We present a silent self-stabilizing distributed algorithm computing a maximal p-star decomposition of the underlying communication network. Under the unfair distributed scheduler, the most general scheduler model, the algorithm converges in at most 12∆m +O(m + n) moves, where m is the number of edges, n is the number of nodes, and ∆ is the maximum node degree. Regarding the move complexity, our algorithm outperforms the previously known best algorithm by a factor of ∆. While the round complexity for the previous algorithm was unknown, we show a 5 ⌊ n p+1 ⌋ + 5 bound for our algorithm.
منابع مشابه
Polynomial Silent Self-Stabilizing Maximal p-Star Decomposition
HAL is a multi-disciplinary open access archive for the deposit and dissemination of scientific research documents, whether they are published or not. The documents may come from teaching and research institutions in France or abroad, or from public or private research centers. L’archive ouverte pluridisciplinaire HAL, est destinée au dépôt et à la diffusion de documents scientifiques de niveau...
متن کاملA Self-stabilizing Algorithm for Maximal p-Star Decomposition of General Graphs
A p-star is a complete bipartite graph K1,p with one center node and p leaf nodes. In this paper we propose the first distributed self-stabilizing algorithm for graph decomposition into p-stars. For a graph G and an integer p ≥ 1, this decomposition provides disjoint components of G where each component forms a p-star. We prove convergence and correctness of the algorithm under an unfair distri...
متن کاملPolynomial-Time Space-Optimal Silent Self-Stabilizing Minimum-Degree Spanning Tree Construction
Motivated by applications to sensor networks, as well as to many other areas, this paper studies the construction of minimum-degree spanning trees. We consider the classical noderegister state model, with a weakly fair scheduler, and we present a space-optimal silent self-stabilizing construction of minimum-degree spanning trees in this model. Computing a spanning tree with minimum degree is NP...
متن کاملSpace-Optimal Silent Self-stabilizing Spanning Tree Constructions Inspired by Proof-Labeling Schemes
We present a general roadmap for the design of space-optimal polynomial-time silent self-stabilizing spanning tree constructions. Our roadmap is based on sequential greedy algorithms inspired from the design of proof-labeling schemes. Context and objective. One desirable property for a self-stabilizing algorithm is to be silent, that is, to keep the individual state of each process unchanged on...
متن کاملOn Proof-Labeling Schemes versus Silent Self-stabilizing Algorithms
It follows from the definition of silent self-stabilization, and from the definition of proof-labeling scheme, that if there exists a silent self-stabilizing algorithm using `-bit registers for solving a task T , then there exists a proof-labeling scheme for T using registers of at most ` bits. The first result in this paper is the converse to this statement. We show that if there exists a proo...
متن کامل