AbstractIn a network stability problem, the aim is to find stable configurations for a given network of boolean gates. For general networks, the problem is known to be computationally hard. Mayr and Subramanian introduced an interesting class of networks by imposing fanout restrictions at each gate, and showed that network stability on this class of networks is still sufficiently rich to express as special cases stable marriage and stable roommate problems. In this paper we study the sequential and parallel complexity of network stability on networks with restricted fanout. Our approach builds on structural properties of these networks and exposes close ties with the theory of retracts and isometric embeddings for product graphs. This struc...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...
We study the stable marriage problem in a distributed setting. The communication network is a bipart...
The stable roommates problem with payments has as input a graph G = (V, E) with an edge weighting w ...
AbstractIn a network stability problem, the aim is to find stable configurations for a given network...
AbstractWe develop a method for nontrivially restricting fanout in a circuit. We study the complexit...
AbstractA parallel algorithm for the stable matching problem is presented. The algorithm is based on...
We describe a flow model related to ordinary network flows the same way as stable matchings are rela...
Contents Preface 7 Lecture I. The Stable Marriage and Stable Roommates Problems 8 1. The Stable Marr...
We consider the distributed complexity of the stable mar-riage problem. In this problem, the communi...
AbstractWe claimed that Stable Matching problems are the same as problems about stable configuration...
In the stable marriage and roommates problems, a set of agents is given, each of them having a stric...
One of the most important stability concepts for network formation is pairwise stability. We develop...
We describe a flow model related to ordinary network flows the same way as stable matchings are rela...
Stable matching (also called stable marriage in the literature) is a problem of matching in a bipart...
Subramanian defined the complexity class CC as the set of problems log-space reducible to the compar...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...
We study the stable marriage problem in a distributed setting. The communication network is a bipart...
The stable roommates problem with payments has as input a graph G = (V, E) with an edge weighting w ...
AbstractIn a network stability problem, the aim is to find stable configurations for a given network...
AbstractWe develop a method for nontrivially restricting fanout in a circuit. We study the complexit...
AbstractA parallel algorithm for the stable matching problem is presented. The algorithm is based on...
We describe a flow model related to ordinary network flows the same way as stable matchings are rela...
Contents Preface 7 Lecture I. The Stable Marriage and Stable Roommates Problems 8 1. The Stable Marr...
We consider the distributed complexity of the stable mar-riage problem. In this problem, the communi...
AbstractWe claimed that Stable Matching problems are the same as problems about stable configuration...
In the stable marriage and roommates problems, a set of agents is given, each of them having a stric...
One of the most important stability concepts for network formation is pairwise stability. We develop...
We describe a flow model related to ordinary network flows the same way as stable matchings are rela...
Stable matching (also called stable marriage in the literature) is a problem of matching in a bipart...
Subramanian defined the complexity class CC as the set of problems log-space reducible to the compar...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...
We study the stable marriage problem in a distributed setting. The communication network is a bipart...
The stable roommates problem with payments has as input a graph G = (V, E) with an edge weighting w ...