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引用次数: 0
摘要
在这篇论文中,我们类比惩罚性模糊解决方法,引入了惩罚性误揭空间分区的概念,目的是将 DIA 估算器的性能导向其与应用相关的可容忍风险目标。我们为误报空间中的每个决策区域分配惩罚函数,并利用误报向量的分布,通过最小化平均惩罚来确定最佳分区。由于每个最小均值惩罚分区取决于给定的惩罚函数,因此可以根据不同的应用做出不同的选择。对于 DIA 估算器,我们引入了一组特殊的惩罚函数,用于惩罚其不想要的结果。我们将展示如何利用这组函数构建最优的 DIA 估算器,即在其类别中,位于用户指定容差区域内的概率最大的估算器。进一步的阐述说明了这些惩罚函数是如何由不同假设的影响偏差驱动的,以及如何在操作中使用这些函数。在此,我们还提供了一个选项,即用额外的未定区域来扩展误判分区,以适应难以区分某些假设或识别不令人信服的情况。通过将与整数模糊解决方法的类比扩展到整数变量模糊解决方法,我们还在类似的更大类别中引入了最大概率估计器。
On the optimality of DIA-estimators: theory and applications
In this contribution, we introduce, in analogy to penalized ambiguity resolution, the concept of penalized misclosure space partitioning, with the goal of directing the performance of the DIA-estimator towards its application-dependent tolerable risk objectives. We assign penalty functions to each of the decision regions in misclosure space and use the distribution of the misclosure vector to determine the optimal partitioning by minimizing the mean penalty. As each minimum mean penalty partitioning depends on the given penalty functions, different choices can be made, in dependence of the application. For the DIA-estimator, we introduce a special set of penalty functions that penalize its unwanted outcomes. It is shown how this set allows one to construct the optimal DIA-estimator, being the estimator that within its class has the largest probability of lying inside a user specified tolerance region. Further elaboration shows how these penalty functions are driven by the influential biases of the different hypotheses and how they can be used operationally. Hereby the option is included of extending the misclosure partitioning with an additional undecided region to accommodate situations when it will be hard to discriminate between some of the hypotheses or when identification is unconvincing. By extending the analogy with integer ambiguity resolution to that of integer-equivariant ambiguity resolution, we also introduce the maximum probability estimator within the similar larger class.
期刊介绍:
The Journal of Geodesy is an international journal concerned with the study of scientific problems of geodesy and related interdisciplinary sciences. Peer-reviewed papers are published on theoretical or modeling studies, and on results of experiments and interpretations. Besides original research papers, the journal includes commissioned review papers on topical subjects and special issues arising from chosen scientific symposia or workshops. The journal covers the whole range of geodetic science and reports on theoretical and applied studies in research areas such as:
-Positioning
-Reference frame
-Geodetic networks
-Modeling and quality control
-Space geodesy
-Remote sensing
-Gravity fields
-Geodynamics