Primal and dual mixed-integer least-squares: distributional statistics and global algorithm

IF 3.9 2区 地球科学 Q1 GEOCHEMISTRY & GEOPHYSICS
P. J. G. Teunissen, L. Massarweh
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引用次数: 0

Abstract

In this contribution we introduce the dual mixed-integer least-squares problem and study it in relation to its primal counterpart. The dual differs from the primal formulation in the order in which the integer ambiguity vector \(a \in {\mathbb {Z}}^{n}\) and baseline vector \(b \in {\mathbb {R}}^{p}\) are estimated. As not the ambiguities, but rather the entries of b are usually the parameters of interest, the attractiveness of the dual formulation stems from its direct computation of b. It is shown that this potential advantage relies on the ease with which an implicit integer least-squares problem of the dual can be solved. For the convoluted cases, we introduce two methods of simplifying approximations. To be able to describe their quality, we provide a complete distributional analysis of their estimators, thus allowing users to judge whether or not the approximations are acceptable for their application. It is shown that this approach implicitly introduces a new class of admissible integer estimators of which we also determine the pull-in regions. As the dual function is shown to lack convexity, special care is required to be able to compute its global minimizer \({\check{b}}\). Our proposed method, which has finite termination with a guaranteed \(\epsilon \)-tolerance, is constructed from combining the branch-and-bound principle, with a special convex-relaxation of the dual, to which the projected-gradient-descent method is applied to obtain the required bounds. Each of the method’s three constituents are described, whereby special emphasis is given to the construction of the required continuously differentiable, convex lower bounding function of the dual.

Abstract Image

原始和对偶混合整数最小二乘法:分布统计和全局算法
在这篇论文中,我们介绍了对偶混合整数最小二乘问题,并将其与初等问题进行了对比研究。二元问题与原始问题的不同之处在于整数模糊向量(a (in {\mathbb {Z}}^{n}\) 和基线向量(b (in {\mathbb {R}}^{p}\) 的估计顺序。由于通常感兴趣的参数不是模糊度,而是 b 的条目,因此对偶公式的吸引力在于它可以直接计算 b。对于复杂的情况,我们引入了两种简化近似的方法。为了描述它们的质量,我们对它们的估计值进行了完整的分布分析,从而使用户能够判断近似值在其应用中是否可以接受。结果表明,这种方法隐含地引入了一类新的可接受整数估计器,我们还确定了它们的拉入区域。由于对偶函数缺乏凸性,因此需要特别注意计算其全局最小值 \({\check{b}}\)。我们所提出的方法具有有限终止和保证的容限(\epsilon \),它是通过将分支与边界原理与对偶函数的特殊凸松弛相结合而构建的,并应用投影梯度上升法来获得所需的边界。本文介绍了该方法的三个组成部分,其中特别强调了构建所需的连续可微分凸下限对偶函数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Journal of Geodesy
Journal of Geodesy 地学-地球化学与地球物理
CiteScore
8.60
自引率
9.10%
发文量
85
审稿时长
9 months
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
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