摘要:AbstractA new deflected subgradient algorithm is presented for computing a tighter lower bound of the dual problem. These bounds may be useful in nodes evaluation in a Branch and Bound algorithm to find the optimal solution of large-scale integer linear programming problems. The deflected direction search used in the present paper is a convex combination of the Modified Gradient Technique and the Average Direction Strategy. We identify the optimal convex combination parameter allowing the deflected subgradient vector direction to form a more acute angle with the best direction towards an optimal solution. The modified algorithm gives encouraging results for a selected symmetric travelling salesman problem (TSPs) instances taken from TSPLIB library.
关键词:Integer linear programming;Subgradient method;Nonsmooth optimization;Travelling salesman problem
