This paper studies distributed binary test of statistical independence under communication (information bits) constraints. While testing independence is very relevant in various applications, distributed independence test is particularly useful for event detection in sensor networks where data correlation often occurs among observations of devices in the presence of a signal of interest. By focusing on the case of two devices because of their tractability, we begin by investigating conditions on Type I error probability restrictions under which the minimum Type II error admits an exponential behavior with the sample size. Then, we study the finite sample-size regime of this problem. We derive new upper and lower bounds for the gap between the minimum Type II error and its exponential approximation under different setups, including restrictions imposed on the vanishing Type I error probability. Our theoretical results shed light on the sample-size regimes at which approximations of the Type II error probability via error exponents became informative enough in the sense of predicting well the actual error probability. We finally discuss an application of our results where the gap is evaluated numerically, and we show that exponential approximations are not only tractable but also a valuable proxy for the Type II probability of error in the finite-length regime.
翻译:本文的论文研究在通信(信息位数)限制下散发了统计独立性的二进制测试。 尽管测试独立性在各种应用中都非常相关,但分布独立测试对于传感器网络中的事件探测特别有用,因为传感器网络中在设备观测中往往出现数据相关性,而设备在有关注信号的情况下也出现数据相关性。通过关注两个装置的可移动性,我们首先调查了类型一差概率限制的条件,根据这些条件,二型最小误差承认了样本大小的指数性行为。随后,我们研究了这一问题的有限抽样规模制度。我们为二型最低误差与不同设置下的指数近似之间的差划出了新的上下边框,包括对消失的I型误差概率的限制。我们的理论结果揭示了样尺寸制度,即二型误差概率通过误差的近似值在预测出实际误差概率方面已变得足够丰富。我们最后讨论了我们结果的运用情况,对差距进行了数字评价,我们发现指数近似不仅可移动,而且也是定时II型误差概率的一个有价值的替代物。