Distribution Approximation , Combinatorial Optimization , and Lagrange - Barrier
نویسنده
چکیده
In this paper, typical analog combinatorial optimization approaches, such as Hopfield net, Hopfield-Lagrange net, Maximum entropy approach, Lagrange-Barrier approach, are systematically examined from the perspective of learning distribution. The minimization of a combinatorial cost is turned into a procedure of learning a simple distribution to approximate the Gibbs distribution induced from this cost such that both the distributions share a same global peak. From this new perspective, a new general guideline is obtained for developing analog combinatorial optimization approaches. Moreover, the Lagrange-Barrier iterative procedure proposed in Xu (1994, 1995a) is further elaborated with guaranteed convergence on a feasible solution that satisfies constraints.
منابع مشابه
A Lagrange Multiplier and Hopfield-Type Barrier Function Method for the Traveling Salesman Problem
A Lagrange multiplier and Hopfield-type barrier function method is proposed for approximating a solution of the traveling salesman problem. The method is derived from applications of Lagrange multipliers and a Hopfield-type barrier function and attempts to produce a solution of high quality by generating a minimum point of a barrier problem for a sequence of descending values of the barrier par...
متن کاملSelecting Efficient Service-providers in Electric Power Distribution Industry Using Combinatorial Reverse Auction
In this paper, a combinatorial reverse auction mechanism is proposed for selecting the most efficient service-providers for resolving sustained power interruptions in multiple regions of an electric power distribution company’s responsibility area. Through this mechanism, supplying the required service in each region is assigned to only one potential service-provider considering two criteria in...
متن کاملLogarithmic Barrier Optimization Problem Using Neural Network
The combinatorial optimization problem is one of the important applications in neural network computation. The solutions of linearly constrained continuous optimization problems are difficult with an exact algorithm, but the algorithm for the solution of such problems is derived by using logarithm barrier function. In this paper we have made an attempt to solve the linear constrained optimizati...
متن کاملA Combined Lagrangian , and Implication Heuristic Partitioning Problems Linear Programming , for Large - Scale Set
Given a finite ground set, a set of subsets, and costs on the subsets, the set partitioning problem is to find a minimum cost partition of the ground set. Many combinatorial optimization problems can be formulated as set partitioning problems. We present an approximation algorithm that produces high-quality solutions in an acceptable amount of computation time. The algorithm is iterative and co...
متن کاملStochastic Combinatorial Optimization under Probabilistic Constraints
In this paper, we present approximation algorithms for combinatorial optimization problems under probabilistic constraints. Specifically, we focus on stochastic variants of two important combinatorial optimization problems: the k-center problem and the set cover problem, with uncertainty characterized by a probability distribution over set of points or elements to be covered. We consider these ...
متن کامل