Dual Bounded Generation: Polynomial, Second-order Cone and Positive Semidefinite Matrix Inequalities

Khaled Elbassioni
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Abstract

In the monotone integer dualization problem, we are given two sets of vectors in an integer box such that no vector in the first set is dominated by a vector in the second. The question is to check if the two sets of vectors cover the entire integer box by upward and downward domination, respectively. It is known that the problem is (quasi-)polynomially equivalent to that of enumerating all maximal feasible solutions of a given monotone system of linear/separable/supermodular inequalities over integer vectors. The equivalence is established via showing that the dual family of minimal infeasible vectors has size bounded by a (quasi-)polynomial in the sizes of the family to be generated and the input description. Continuing in this line of work, in this paper, we consider systems of polynomial, second-order cone, and semidefinite inequalities. We give sufficient conditions under which such bounds can be established and highlight some applications.
二元有界生成:多项式、二阶圆锥和正半有限矩阵不等式
在单调整数二元化问题中,我们给定了一个整数框中的两组向量,使得第一组向量中没有一个被第二组向量支配。问题是检验这两组向量是否分别通过向上和向下支配的方式覆盖整个整数框。众所周知,这个问题(准)多项式等价于枚举给定的整数向量线性/可分/超模不等式单调系统的所有最大可行解。通过证明最小不可行向量的对偶族的大小与要生成的族的大小和输入描述的大小成(准)多项式,等价性得以建立。本文继续沿着这一思路,考虑了多项式、二阶锥不等式和半定式不等式系统。我们给出了建立此类边界的充分条件,并重点介绍了一些应用。
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