Competitive equilibrium with equal income (CEEI) is considered one of the best mechanisms to allocate a set of items among agents fairly and efficiently. In this paper, we study the computation of CEEI when items are chores that are disliked (negatively valued) by agents, under 1-homogeneous and concave utility functions which includes linear functions as a subcase. It is well-known that, even with linear utilities, the set of CEEI may be non-convex and disconnected, and the problem is PPAD-hard in the more general exchange model. In contrast to these negative results, we design FPTAS: A polynomial-time algorithm to compute $\epsilon$-approximate CEEI where the running-time depends polynomially on $1/\epsilon$. Our algorithm relies on the recent characterization due to Bogomolnaia et al.~(2017) of the CEEI set as exactly the KKT points of a non-convex minimization problem that have all coordinates non-zero. Due to this non-zero constraint, naive gradient-based methods fail to find the desired local minima as they are attracted towards zero. We develop an exterior-point method that alternates between guessing non-zero KKT points and maximizing the objective along supporting hyperplanes at these points. We show that this procedure must converge quickly to an approximate KKT point which then can be mapped to an approximate CEEI; this exterior point method may be of independent interest. When utility functions are linear, we give explicit procedures for finding the exact iterates, and as a result show that a stronger form of approximate CEEI can be found in polynomial time. Finally, we note that our algorithm extends to the setting of un-equal incomes (CE), and to mixed manna with linear utilities where each agent may like (positively value) some items and dislike (negatively value) others.
翻译:平等收入( CEEI) 的竞争性平衡被认为是在代理商之间公平和高效地分配一组项目的最佳机制之一。 在本文中, 我们研究当代理商不喜欢( 负价值) 的杂务物品时, 在1个混合和连锁的公用事业功能下, 包括线性功能作为子体。 众所周知, 即使线性公用事业, 中东欧的一组可能是非混凝土和断开的, 问题在于更普遍的交换模式中PPPDAD- 极硬的。 与这些负面结果相反, 我们设计了FPTAS: 混合时间算法可以计算出$\ epsilon$- pap 的杂务, 由代理商在1/\\\ epslonlon 的杂务中, 我们的算法取决于最近对Bogoomolna man et al. ~ ( 2017) 的描述, 内基建公司将非centrial- modicial listrical lal moal moal moal moal moal motion motion motion motion ral macal 也可以化的点, 也可以化为不比重。 。 我们的直立地算法不能在其中找到 方法上, 一种最接近一种最接近一种最接近于一种最接近的 方法。