We develop new techniques for deriving very strong computational lower bounds for a class of well-known NP-hard problems, including weighted satisfiability, dominating set, hitting set, set cover, clique, and independent set. For example, although a trivial enumeration can easily test in time O(nk) if a given graph of n vertices has a clique of size k, we prove that unless an unlikely collapse occurs in parameterized complexity theory, the problem is not solvable in time f(k) no(k) for any function f, even if we restrict the parameter value k to be bounded by an arbitrarily small function of n. Under the same assumption, we prove that even if we restrict the parameter values k to be Θ(μ(n)) for any reasonable function μ, no algorithm of running time no(k) can test if a graph of n vertices has a clique of size k. Similar strong lower bounds are also derived for other problems in the above class. Our techniques can be extended to derive computational lower bounds on approximation algorithms for NP-hard optimization problems. For example, we prove that the NP-hard distinguishing substring selection problem, for which a polynomial time approximation scheme has been recently developed, has no polynomial time approximation schemes of running time f(1/ε)no(1/ε) for any function f unless an unlikely collapse occurs in parameterized complexity theory.
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机译:我们开发了新技术,可以为一类众所周知的NP难问题推导非常强的计算下界,包括加权可满足性,支配集,击球集< / SC>,集覆盖, clique 和独立集。例如,尽管一个简单的枚举可以很容易地在时间O(n k )中测试给定的n个顶点图的大小为k,但是我们证明,除非在参数化复杂度理论中发生不太可能的崩溃,即使我们将参数值k限制为任意范围,对于 any 函数f来说,问题也无法在时间f(k)n o(k)上解决。 n。小功能在相同的假设下,我们证明即使对于任何合理函数μ将参数值k限制为Θ(μ(n)),也没有运行时间n o(k)的算法可以测试n个顶点的图是否具有大小为k的团。对于上述类别中的其他问题,也得出了类似的强下界。我们的技术可以扩展为NP硬优化问题的近似算法的计算下界。例如,我们证明了最近开发了多项式时间近似方案的NP硬区分子串选择问题,没有运行时间f(1 /ε)n的多项式时间近似方案。任何函数f的 o(1 /ε),除非在参数化复杂度理论中发生不太可能的崩溃。
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