This paper addresses the competitiveness of online algorithms for two Steiner Tree problems. In the first problem, the underlying graph is directed and has bounded asymmetry, namely the maximum weight of antiparallel links in the graph does not excee d a parameter α. Previous work on this problem has left a gap on the competitive ratio which is as large as logarithmic in k. We present a refined analysis, both in terms of the upper and the lower bounds, that closes the gap and shows that a greedy algorithm is optimal for all values of the parameter α. The second part of the paper addresses the Euclidean Steiner tree problem on the plane. Alon and Azar [SoCG 1992, Disc. Comp. Geom. 1993] gave an elegant lower bound on the competitive ratio of any deterministic algorithm equal to Ω(log k/log log k); however, the best known upper bound is the trivial bound O(log k). We give the first analysis that makes progress towards closing this long-standing gap. In particular, we present an online algorithm with competitive ratio O(log k/log log k), provided that the optimal offline Steiner tree belongs in a class of trees with relatively simple structure. This class comprises not only the adversarial instances of Alon and Azar, but also all rectilinear Steiner trees which can be decomposed in a polylogarithmic number of rectilinear full Steiner trees.
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机译:本文涉及两种施蒂纳树问题的在线算法的竞争力。在第一问题中,底层图是有界性的,并且具有界分的不对称性,即图中的反平行链路的最大重量不可达到参数α。以前的解决这个问题留下了竞争比例的差距,这与k中的对数一样大。我们在上限和下限方面提出了一种精致的分析,其关闭间隙并表明贪婪算法对于参数α的所有值是最佳的。本文的第二部分在飞机上讨论了欧几里德施泰纳树问题。 ALON和AZAR [SOCG 1992,光盘。 Comp。地质。 1993]在等于ω的任何确定性算法的竞争比率上发出了优雅的下限(log k / log log k);但是,最知名的上限是琐碎的o(log k)。我们提供了第一次分析,从而实现了缩小这种长期差距的进展。特别是,我们介绍了一个具有竞争比率O的在线算法O(log k / log log k),条件是最佳离线施蒂纳树属于一类具有相对简单结构的树木。该等阶级不仅包括Alon和Azar的对抗实例,而且还包括所有直线静脉树,它可以在直线数量的全施泰勒树中分解。
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