Approximation Algorithms with Constant Factors for a Series of Asymmetric Routing Problems

Pub Date : 2024-03-14 DOI:10.1134/S1064562423701454
E. D. Neznakhina, Yu. Yu. Ogorodnikov, K. V. Rizhenko,  M. Yu. Khachay
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Abstract

In this paper, the first fixed-ratio approximation algorithms are proposed for a series of asymmetric settings of well-known combinatorial routing problems. Among them are the Steiner cycle problem, the prize-collecting traveling salesman problem, the minimum cost cycle cover problem by a bounded number of cycles, etc. Almost all of the proposed algorithms rely on original reductions of the considered problems to auxiliary instances of the asymmetric traveling salesman problem and employ the breakthrough approximation results for this problem obtained recently by O. Svensson, J. Tarnawski, L. Végh, V. Traub, and J. Vygen. On the other hand, approximation of the cycle cover problem was proved by applying a deeper extension of their approach.

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一系列非对称路由问题的恒因子近似算法
本文首次针对一系列非对称设置的著名组合路由问题提出了固定比率近似算法。其中包括斯坦纳循环问题、有奖旅行推销员问题、有界循环数的最小成本循环覆盖问题等。几乎所有提出的算法都依赖于将所考虑的问题原封不动地还原为非对称旅行推销员问题的辅助实例,并采用 O. Svensson、J. Tarnawski、L. Végh、V. Traub 和 J. Vygen 最近获得的该问题的突破性近似结果。另一方面,通过对他们的方法进行更深入的扩展,证明了循环覆盖问题的近似性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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