关于逼近支配集的参数化复杂度

S. KarthikC., Bundit Laekhanukit, Pasin Manurangsi
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引用次数: 14

摘要

研究了参数化近似k-Dominating集(DomSet)问题的复杂性,整数k和给出图G在n顶点作为输入,目标是找到一组主导的大小最多F (k)⋅k每当图G有一组主导的k大小。当这样的一个算法在时间T (k)⋅聚(n)(例如,FPT-time)对于一些可计算函数T,据说是一个F (k) -FPT-approximation k-DomSet算法。是否存在这样的算法在唐尼和费罗(2013)的开创性著作中被列为参数化复杂性中“最臭名昭著的”开放问题之一。本文给出了在W[1]≠FPT条件下不存在这种算法的基本答案,并在更强的假设条件下提供了更严格的运行时间下界。具体地说,我们证明了对于每一个可计算函数T, F和每一个常数ε > 0:•假设W[1]≠FPT,对于k- domset不存在F(k)-FPT逼近算法。•假设指数时间假设(ETH),对于k- domset,不存在运行在T(k)⋅no(k)时间内的F(k)近似算法。•假设强指数时间假设(SETH),对于每一个k≥2的整数,不存在运行在T(k)⋅nk−ε时间内的k- domset的F(k)逼近算法。•假设k- sum假设,对于每一个整数k≥3,不存在k- domset的F(k)逼近算法在T(k)⋅n (k /2)−ε时间内运行。在此之前,只有在sf W[1]≠FPT条件下排除了常数比FPT近似算法,在ETH条件下排除了(log1/4 & - ε k)-FPT近似算法[Chen and Lin, FOCS 2016]。最近,在Gap-ETH下证明了任何函数F的F(k)- fpt逼近算法不存在[Chalermsook et al., FOCS 2017]。请注意,据我们所知,对于任何δ > 0的绝对常数,甚至对于任何常数不近似比,都没有已知的运行时间n& k的下界。我们的结果是通过建立通信复杂性和近似硬度之间的联系获得的,推广了Abboud等人最近突破性工作的想法[FOCS 2017]。具体地说,我们表明,为了证明标签覆盖问题的某个参数化变体的逼近的硬度,它足以为通信问题设计一个特定的协议,这取决于我们所依赖的假设。这些交流问题中的每一个都被证明要么是一个研究得很好的问题,要么是一个问题的变体;这使得我们可以很容易地应用已知的技术来解决它们。
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On the Parameterized Complexity of Approximating Dominating Set
We study the parameterized complexity of approximating the k-Dominating Set (DomSet) problem where an integer k and a graph G on n vertices are given as input, and the goal is to find a dominating set of size at most F(k) ⋅ k whenever the graph G has a dominating set of size k. When such an algorithm runs in time T(k) ⋅ poly (n) (i.e., FPT-time) for some computable function T, it is said to be an F(k)-FPT-approximation algorithm for k-DomSet. Whether such an algorithm exists is listed in the seminal book of Downey and Fellows (2013) as one of the “most infamous” open problems in parameterized complexity. This work gives an almost complete answer to this question by showing the non-existence of such an algorithm under W[1] ≠ FPT and further providing tighter running time lower bounds under stronger hypotheses. Specifically, we prove the following for every computable functions T, F and every constant ε > 0: • Assuming W[1] ≠ FPT, there is no F(k)-FPT-approximation algorithm for k-DomSet. • Assuming the Exponential Time Hypothesis (ETH), there is no F(k)-approximation algorithm for k-DomSet that runs in T(k) ⋅ no(k) time. • Assuming the Strong Exponential Time Hypothesis (SETH), for every integer k ≥ 2, there is no F(k)-approximation algorithm for k-DomSet that runs in T(k) ⋅ nk − ε time. • Assuming the k-SUM Hypothesis, for every integer k ≥ 3, there is no F(k)-approximation algorithm for k-DomSet that runs in T(k) ⋅ n⌈ k/2 ⌉ − ε time. Previously, only constant ratio FPT-approximation algorithms were ruled out under sf W[1] ≠ FPT and (log1/4 &minus ε k)-FPT-approximation algorithms were ruled out under ETH [Chen and Lin, FOCS 2016]. Recently, the non-existence of an F(k)-FPT-approximation algorithm for any function F was shown under Gap-ETH [Chalermsook et al., FOCS 2017]. Note that, to the best of our knowledge, no running time lower bound of the form n&delta k for any absolute constant δ > 0 was known before even for any constant factor inapproximation ratio. Our results are obtained by establishing a connection between communication complexity and hardness of approximation, generalizing the ideas from a recent breakthrough work of Abboud et al. [FOCS 2017]. Specifically, we show that to prove hardness of approximation of a certain parameterized variant of the label cover problem, it suffices to devise a specific protocol for a communication problem that depends on which hypothesis we rely on. Each of these communication problems turns out to be either a well-studied problem or a variant of one; this allows us to easily apply known techniques to solve them.
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