关于分布假设检验中的学习速率

Anusha Lalitha, T. Javidi
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引用次数: 3

摘要

本文研究了分布式假设检验和合作学习问题。网络中的单个节点接收有噪声的局部(私有)观测,其分布由离散参数(假设)参数化。条件分布在局部节点上是已知的,但真正的参数/假设是未知的。我们从以前的文献中考虑一个社会(“非贝叶斯”)学习规则,其中节点首先根据他们的局部观察对参数的信念(分布估计)执行贝叶斯更新,将这些更新传达给他们的邻居,然后使用他们邻居的对数信念执行“非贝叶斯”线性共识。对于这个学习规则,我们知道,在温和的假设下,任何节点在任何不正确参数下的信念以指数速度收敛于零,并且学习的指数速度是由网络结构和观测值分布之间的发散度表征的。推导了非周期网络中偏离该标称速率的概率的严格界限。对于满足温和有界矩条件的所有条件分布,边界都成立。
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On the rate of learning in distributed hypothesis testing
This paper considers a problem of distributed hypothesis testing and cooperative learning. Individual nodes in a network receive noisy local (private) observations whose distribution is parameterized by a discrete parameter (hypotheses). The conditional distributions are known locally at the nodes, but the true parameter/hypothesis is not known. We consider a social (“non-Bayesian”) learning rule from previous literature, in which nodes first perform a Bayesian update of their belief (distribution estimate) of the parameter based on their local observation, communicate these updates to their neighbors, and then perform a “non-Bayesian” linear consensus using the log-beliefs of their neighbors. For this learning rule, we know that under mild assumptions, the belief of any node in any incorrect parameter converges to zero exponentially fast, and the exponential rate of learning is a characterized by the network structure and the divergences between the observations' distributions. Tight bounds on the probability of deviating from this nominal rate in aperiodic networks is derived. The bounds are shown to hold for all conditional distributions which satisfy a mild bounded moment condition.
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