Mixed-integer quadratic programming is in NP

被引：0

作者：

Alberto Del Pia

Santanu S. Dey

Marco Molinaro

机构：

[1] University of Wisconsin-Madison,Department of Industrial and Systems Engineering & Wisconsin Institute for Discovery

[2] PUC-Rio,Computer Science Department

来源：

Mathematical Programming | 2017年 / 162卷

关键词：

Quadratic programming; Integer programming; Complexity; 90C11; 90C20; 90C60;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Mixed-integer quadratic programming is the problem of optimizing a quadratic function over points in a polyhedral set where some of the components are restricted to be integral. In this paper, we prove that the decision version of mixed-integer quadratic programming is in NP, thereby showing that it is NP-complete. This is established by showing that if the decision version of mixed-integer quadratic programming is feasible, then there exists a solution of polynomial size. This result generalizes and unifies classical results that quadratic programming is in NP (Vavasis in Inf Process Lett 36(2):73–77 [17]) and integer linear programming is in NP (Borosh and Treybig in Proc Am Math Soc 55:299–304 [1], von zur Gathen and Sieveking in Proc Am Math Soc 72:155–158 [18], Kannan and Monma in Lecture Notes in Economics and Mathematical Systems, vol. 157, pp. 161–172. Springer [9], Papadimitriou in J Assoc Comput Mach 28:765–768 [15]).

引用

页码：225 / 240

页数：15

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