In this paper we are concerned with the problem of unboundedness and existence of an optimal solution in reverse convex and concave integer optimization problems. In particular, we present necessary and sufficient conditions for existence of an upper bound for a convex objective function defined over the feasible region contained in mathbbZn{mathbb{Z}^n}. The conditions for boundedness are provided in a form of an implementable algorithm, showing that for the considered class of functions, the integer programming problem is unbounded if and only if the associated continuous problem is unbounded. We also address the problem of boundedness in the global optimization problem of maximizing a convex function over a set of integers contained in a convex and unbounded region. It is shown in the paper that in both types of integer programming problems, the objective function is either unbounded from above, or it attains its maximum at a feasible integer point.
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机译:在本文中,我们关注的是无边界问题和反向凸和凹整数优化问题中的最优解的存在。特别地,我们为在mathbbZ n {mathbb {Z} ^ n}中包含的可行区域上定义的凸目标函数的上限存在的存在提供了充要条件。有界条件以一种可实现的算法的形式提供,表明对于所考虑的函数类别,当且仅当关联的连续问题无界时,整数编程问题才是无界的。我们还将解决全局优化问题中的有界性问题,该问题是使包含在凸和无界区域中的一组整数上的凸函数最大化。本文表明,在两种类型的整数编程问题中,目标函数要么不受上界限制,要么在可行的整数点处达到最大值。
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