Random graph models with community structure have been studied extensively in the literature. For both the problems of detecting and recovering community structure, an interesting landscape of statistical and computational phase transitions has emerged. A natural unanswered question is: might it be possible to infer properties of the community structure (for instance, the number and sizes of communities) even in situations where actually finding those communities is believed to be computationally hard? We show the answer is no. In particular, we consider certain hypothesis testing problems between models with different community structures, and we show (in the low-degree polynomial framework) that testing between two options is as hard as finding the communities. In addition, our methods give the first computational lower bounds for testing between two different `planted' distributions, whereas previous results have considered testing between a planted distribution and an i.i.d. `null' distribution.
翻译:文献中广泛研究了社区结构的随机图形模型。对于社区结构的探测和恢复问题,出现了统计和计算阶段转型的有趣景象。一个自然的未解问题是:即使实际发现社区结构的特性(例如社区的数目和规模)被认为在计算上很困难,也可能推断社区结构的特性(例如社区的数目和规模)?我们显示答案是否定的。我们特别考虑到不同社区结构模型之间的某些假设测试问题,我们(在低度多元度框架)表明,在两种选择之间进行测试与寻找社区一样困难。此外,我们的方法为两种不同的“种植”分布之间的测试提供了第一个计算较低界限,而以前的结果考虑了种植分布与i.d.`核'分布之间的测试。
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