The Parameterized Complexity of the k-Biclique Problem

Bingkai Lin
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引用次数: 36

Abstract

Given a graph G and an integer k, the k-Biclique problem asks whether G contains a complete bipartite subgraph with k vertices on each side. Whether there is an f(k) ċ |G|O(1)-time algorithm, solving k-Biclique for some computable function f has been a longstanding open problem. We show that k-Biclique is W[1]-hard, which implies that such an f(k) ċ |G|O(1)-time algorithm does not exist under the hypothesis W[1] ≠ FPT from parameterized complexity theory. To prove this result, we give a reduction which, for every n-vertex graph G and small integer k, constructs a bipartite graph H = (L⊍ R,E) in time polynomial in n such that if G contains a clique with k vertices, then there are k(k − 1)/2 vertices in L with nθ(1/k) common neighbors; otherwise, any k(k − 1)/2 vertices in L have at most (k+1)! common neighbors. An additional feature of this reduction is that it creates a gap on the right side of the biclique. Such a gap might have further applications in proving hardness of approximation results. Assuming a randomized version of Exponential Time Hypothesis, we establish an f(k) ċ |G|o(√k)-time lower bound for k-Biclique for any computable function f. Combining our result with the work of Bulatov and Marx [2014], we obtain a dichotomy classification of the parameterized complexity of cardinality constraint satisfaction problems.
k-比克形问题的参数化复杂度
给定一个图G和一个整数k, k- biclique问题问的是G是否包含一个每边有k个顶点的完全二部子图。是否有一个f (k)ċ| | G O(1)算法,解决k-Biclique对于一些可计算函数f是一个长期的开放问题。我们从参数化复杂性理论证明了k- biclique是W[1]-hard的,这意味着在W[1]≠FPT的假设下,f(k) * |G|O(1)时间算法不存在。为了证明这一结果,我们给出了一个约简,对于每一个n顶点图G和小整数k,在n的时间多项式上构造一个二部图H = (L R,E),使得如果G包含有k个顶点的团,则L中有k(k−1)/2个顶点具有nθ(1/k)个共邻;否则,L中的任何k(k−1)/2个顶点最多有(k+1)!常见的邻居。这种减少的另一个特点是,它在自行车的右侧产生一个间隙。这种差距可能在证明近似结果的硬度方面有进一步的应用。假设随机版本的指数时间的假设,我们建立一个f (k)ċ| | G o(√k) -下界为k-Biclique任何可计算函数f。将我们的结果与Bulatov和马克思的工作[2014],我们获得一个二分法分类的参数化基数约束满足问题的复杂性。
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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