报告主题:具有快速收敛的多项式离散规划的线性模型
报告人: 方述诚 教授 (美国北卡州立大学)
报告时间:2016年12月14日(周三)16:00
报告地点:校本部G508
邀请人:白延琴
主办部门:理学院数学系
报告摘要:
Optimization models involving a polynomial objective function and multiple polynomial constraints with discrete variables are often encountered in engineering, management and systems. Treating the non-convex cross-product terms is the key. State-of-the-art methods usually convert such a problem into a 0-1 mixed integer linear programming problem, and, then, adopt a branch-and-bound scheme to find an optimal solution. Much effort has been spent on reducing the required numbers of variables and linear constraints as well as on avoiding unbalanced branch-and-bound trees. This talk presents a novel idea of linearizing the discrete cross-product terms in an extremely effective manner. Theoretical analysis shows that the new method significantly reduces the required number of linear constraints from O(h3n3) to O(hn) for a cubic polynomial discrete program with n variables in h possible values. Numerical experiments also conform a two-order (102 times) reduction in computational time for randomly generated problems with millions of variables and constraints.
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