AbstractKarp and Zhang developed a general randomized parallel algorithm for solving branch and bound problems. They showed that with high probability their algorithm attained optimal speedup within a constant factor (for p⩽n/(logn)c, where p is the number of processors, n is the “size” of the problem, and c is a constant). Ranade later simplified the analysis and obtained a better processor bound. Karp and Zhang's algorithm works on models of computation where communication cost is constant. The present paper considers the Branch and Bound problem on networks where the communication cost is high. Suppose sending a message in a p processor network takes G=O(logp) time and node expansion (defined below) takes unit time (other operations bein...
Branch and Bound (B&B) algorithms are exact methods used to solve combinatorial optimization problem...
In this paper, we consider random communication requirements and several cost measures for a par...
Cover title.Includes bibliographical references (p. 12).Supported by the National Science Foundation...
AbstractKarp and Zhang developed a general randomized parallel algorithm for solving branch and boun...
The branch-and-bound problem involves determining the leaf of minimum cost in a cost-labelled, heap-...
The branch-and-bound problem involves determining the leaf of minimum cost in a cost-labelled, heap-...
This paper is the first to present a parallelization of a highly efficient best-first branch-and-bou...
This paper is the first to present a parallelization of a higly efficient best-first branch-and-boun...
[[abstract]]The branch & bound is an important design strategy of algorithm to solve NP-complete com...
Many tree–structured computations are inherently parallel. As leaf processes are recursively spawne...
Branch-and-Bound is a strategy widely used to find optimal solutions for hard combinatorial optimisa...
We consider parallel random access machines (PRAM's) with p processors and distributed systems of ra...
Motivated by the increasing need for fast processing of large-scale graphs, we study a number of fun...
AbstractLower bounds for distributed algorithms for complete networks of processors (i.e., networks ...
AbstractWe propose a model, LPRAM, for parallel random access machines with local memory that captur...
Branch and Bound (B&B) algorithms are exact methods used to solve combinatorial optimization problem...
In this paper, we consider random communication requirements and several cost measures for a par...
Cover title.Includes bibliographical references (p. 12).Supported by the National Science Foundation...
AbstractKarp and Zhang developed a general randomized parallel algorithm for solving branch and boun...
The branch-and-bound problem involves determining the leaf of minimum cost in a cost-labelled, heap-...
The branch-and-bound problem involves determining the leaf of minimum cost in a cost-labelled, heap-...
This paper is the first to present a parallelization of a highly efficient best-first branch-and-bou...
This paper is the first to present a parallelization of a higly efficient best-first branch-and-boun...
[[abstract]]The branch & bound is an important design strategy of algorithm to solve NP-complete com...
Many tree–structured computations are inherently parallel. As leaf processes are recursively spawne...
Branch-and-Bound is a strategy widely used to find optimal solutions for hard combinatorial optimisa...
We consider parallel random access machines (PRAM's) with p processors and distributed systems of ra...
Motivated by the increasing need for fast processing of large-scale graphs, we study a number of fun...
AbstractLower bounds for distributed algorithms for complete networks of processors (i.e., networks ...
AbstractWe propose a model, LPRAM, for parallel random access machines with local memory that captur...
Branch and Bound (B&B) algorithms are exact methods used to solve combinatorial optimization problem...
In this paper, we consider random communication requirements and several cost measures for a par...
Cover title.Includes bibliographical references (p. 12).Supported by the National Science Foundation...