In this paper we devise randomized parallel algorithms which given a unary weighted (di)graph G=(V, E)construct in time O(log2| V|) branchings, perfect matchings, and disjoint cycles of weight exactly k belonging to G. These problems have been studied by Papadimitriou and Yannakakis [PY1], by Barahona and Pulleyblank [BP], by Camerini et al [CGM], and by Mulmuley et al. [MVV]. Our algorithms improve previous solutions. Moreover, we give an NC2 algorithm for computing the absolute value of the pfaffian of a skew-symmetric matrix
The Pfaffian of an oriented graph is closely linked to perfect matching. It is also naturally relate...
<p>We develop algorithms to approximately count perfect matchings in bipartite graphs (or permanents...
We present a technique for converting RNC algorithms into NC algorithms. Our approach is based on a ...
© Shafi Goldwasser and Ofer Grossman;. We present a pseudo-deterministic NC algorithm for finding pe...
A fundamental quest in the theory of computing is to understand the power of randomness. It is not k...
Abstract: "In this paper, the parallel complexity of the Random Matching Problem-a problem of genera...
AbstractWe develop some general techniques for converting randomized parallel algorithms into determ...
AbstractThe intensive study of fast parallel and distributed algorithms for various routing (and com...
We investigate efficient randomized methods for approximating the number of perfect matchings in bip...
We give tight bounds on the parallel complexity of some problems involving random graphs. Speci call...
AbstractSome structural relationships between matchings and independent sets are presented. One cons...
We show that simple sequential randomized iterative algo-rithms for random permutation, list contrac...
We give a RNC algorithm to sample matchings from a distribution on the set of matchings in a graph. ...
ABSTRACT The greedy sequential algorithm for maximal independent set (MIS) loops over the vertices i...
AbstractThe Pfaffian of an oriented graph is closely linked to perfect matching. It is also naturall...
The Pfaffian of an oriented graph is closely linked to perfect matching. It is also naturally relate...
<p>We develop algorithms to approximately count perfect matchings in bipartite graphs (or permanents...
We present a technique for converting RNC algorithms into NC algorithms. Our approach is based on a ...
© Shafi Goldwasser and Ofer Grossman;. We present a pseudo-deterministic NC algorithm for finding pe...
A fundamental quest in the theory of computing is to understand the power of randomness. It is not k...
Abstract: "In this paper, the parallel complexity of the Random Matching Problem-a problem of genera...
AbstractWe develop some general techniques for converting randomized parallel algorithms into determ...
AbstractThe intensive study of fast parallel and distributed algorithms for various routing (and com...
We investigate efficient randomized methods for approximating the number of perfect matchings in bip...
We give tight bounds on the parallel complexity of some problems involving random graphs. Speci call...
AbstractSome structural relationships between matchings and independent sets are presented. One cons...
We show that simple sequential randomized iterative algo-rithms for random permutation, list contrac...
We give a RNC algorithm to sample matchings from a distribution on the set of matchings in a graph. ...
ABSTRACT The greedy sequential algorithm for maximal independent set (MIS) loops over the vertices i...
AbstractThe Pfaffian of an oriented graph is closely linked to perfect matching. It is also naturall...
The Pfaffian of an oriented graph is closely linked to perfect matching. It is also naturally relate...
<p>We develop algorithms to approximately count perfect matchings in bipartite graphs (or permanents...
We present a technique for converting RNC algorithms into NC algorithms. Our approach is based on a ...