基于测量信息论的小样本粗大误差处理研究

在小样本情况下,传统的基于统计原理的误差处理理论不能正确判定粗大误差。采用基于测量信息论的方法来判别测量数据中的粗大误差,将顺序统计量、秩和信息熵等概念引入误差处理理论用以判别小样本情况下的测量数据中是否存在粗大误差。分别采用基于测量信息论的方法和基于统计理论的误差处理方法,对实验数据进行处理和分析,表明基于测量信息论的粗大误差判别方法在小样本数据的粗大误差处理中具有优势。

被测量信息熵、测量误差熵及其关系

从信息论角度建立被测量、测量误差和测量结果的数学模型。给出被测量信息熵、测量误差熵和测量结果信息熵的定义、相互关系以及求解方法。并指出典型分布下不确定度、置信系数与信息熵的数学关系。

推动物联网化传感校准技术的研究

信息论推动了测量技术的发展,基于物联网的测量技术是目前测控技术的研究方向之一。为了实现传感器校准的物联网化,提出了一种信息化的激光外差法微位移校准技术,通过对校准系统的分析,推导出数学模型,并以此为实例,分别对其进行传统误差理论和测量信息论的不确定性评估。实验表明,该校准系统的不确定度小于0.1%,同时通过对比可以得出测量信息论在应用于不确定度分析时比传统的误差理论更为精确且处理方法更加简便。

Separability criteria via some classes of measurements

Mutually unbiased bases (MUBs) and symmetric informationally complete (SIC) positive operator-valued measurements (POVMs) are two related topics in quantum information theory. They are generalized to mutually unbiased measurements (MUMs) and general symmetric informationally complete (GSIC) measurements, respectively, that are both not necessarily rank 1. We study the quantum separability problem by using these measurements and present separability criteria for bipartite systems with arbitrary dimensions and multipartite systems of multi-level subsystems. These criteria are proved to be more effective than previous criteria especially when the dimensions of the subsystems are different. Furthermore, full quantum state tomography is not needed when these criteria are implemented in experiment.