Self-stabilizing and silent distributed algorithms for token distribution in rooted tree networks are given. Initially, each process of a graph holds at most l tokens. Our goal is to distribute the tokens in the whole network so that every process holds exactly k tokens. In the initial configuration, the total number of tokens in the network may not be equal to nk where n is the number of processes in the network. The root process is given the ability to create a new token or remove a token from the network. We aim to minimize the convergence time, the number of token moves, and the space complexity. A self-stabilizing token distribution algorithm that converges within O(n l) asynchronous rounds and needs Theta(nh epsilon) redundant (or unn...
Self-stabilization in a model of anonymous, asynchronous interacting agents deployed in a network o...
International audienceWe propose a general scheme to compute tree-based data structures on arbitrary...
This paper presents a randomized self-stabilizing algorithm that elects a leader r in a general n-no...
Self-stabilizing and silent distributed algorithms for token distribution in rooted tree networks ar...
International audienceThis work focuses on self-stabilizing algorithms for mutual exclusion and lead...
The notion of self-stabilization was introduced by Dijkstra. He defined a system as self-stabilizing...
The self-stabilizing distributed depth-ørst token circulation algorithms have many applications in d...
[[abstract]]A self-stabilizing protocol for token circulation in a connected, uniform network of nod...
[[abstract]]Consider a connected graph with nodes (or processes) and edges (or communication links)....
: We present a deterministic distributed depth-first token passing protocol on a rooted network. Thi...
[[abstract]]This paper proposes a self-stabilizing protocol which circulates a token on a connected ...
Abstract: We present a deterministic distributed depth- rst token passing protocol on a rooted netwo...
We give a silent self-stabilizing protocol for computing a maximum matching in an anonymous network ...
Self-Stabilization was first introduced by Dijkstra in [Dij74]. In this pioneering paper, Dijkstra d...
14 pages; International conférence; Uniform self-stabilizing variant of the problemInternational aud...
Self-stabilization in a model of anonymous, asynchronous interacting agents deployed in a network o...
International audienceWe propose a general scheme to compute tree-based data structures on arbitrary...
This paper presents a randomized self-stabilizing algorithm that elects a leader r in a general n-no...
Self-stabilizing and silent distributed algorithms for token distribution in rooted tree networks ar...
International audienceThis work focuses on self-stabilizing algorithms for mutual exclusion and lead...
The notion of self-stabilization was introduced by Dijkstra. He defined a system as self-stabilizing...
The self-stabilizing distributed depth-ørst token circulation algorithms have many applications in d...
[[abstract]]A self-stabilizing protocol for token circulation in a connected, uniform network of nod...
[[abstract]]Consider a connected graph with nodes (or processes) and edges (or communication links)....
: We present a deterministic distributed depth-first token passing protocol on a rooted network. Thi...
[[abstract]]This paper proposes a self-stabilizing protocol which circulates a token on a connected ...
Abstract: We present a deterministic distributed depth- rst token passing protocol on a rooted netwo...
We give a silent self-stabilizing protocol for computing a maximum matching in an anonymous network ...
Self-Stabilization was first introduced by Dijkstra in [Dij74]. In this pioneering paper, Dijkstra d...
14 pages; International conférence; Uniform self-stabilizing variant of the problemInternational aud...
Self-stabilization in a model of anonymous, asynchronous interacting agents deployed in a network o...
International audienceWe propose a general scheme to compute tree-based data structures on arbitrary...
This paper presents a randomized self-stabilizing algorithm that elects a leader r in a general n-no...