群标记多图的同步

Andrea Porfiri Dal Cin, L. Magri, F. Arrigoni, Andrea Fusiello, G. Boracchi
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引用次数: 2

摘要

同步是指推断图的顶点所附加的未知值的问题,其中的边被标记为事件顶点的比例,并且标签属于一个组。本文研究了多图上的同步问题,即有多条边连接同一对节点的图。当有多个度量方法可用于对两个顶点之间的关系进行建模时,自然会出现问题。当不同的传感器测量相同的量时,或者当原始图被分割成独立求解的子图时,就会发生这种情况。在这种情况下,子图之间的关系产生了多边,问题可以追溯到多图同步。基线解决方案通过平均多边将多图简化为简单图,然而这种方法存在不足,因为:i)平均仅对某些组有很好的定义,ii)结果估计器不太精确和准确,正如我们经验证明的那样。具体来说,我们提出了MULTISYNC,一种基于原则约束特征值优化的多图同步算法。MULTISYNC是一种通用的解决方案,可以处理任何线性群,我们证明了它在综合和实际问题上都是有益的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Synchronization of Group-labelled Multi-graphs
Synchronization refers to the problem of inferring the unknown values attached to vertices of a graph where edges are labelled with the ratio of the incident vertices, and labels belong to a group. This paper addresses the synchronization problem on multi-graphs, that are graphs with more than one edge connecting the same pair of nodes. The problem naturally arises when multiple measures are available to model the relationship between two vertices. This happens when different sensors measure the same quantity, or when the original graph is partitioned into sub-graphs that are solved independently. In this case, the relationships among sub-graphs give rise to multi-edges and the problem can be traced back to a multi-graph synchronization. The baseline solution reduces multi-graphs to simple ones by averaging their multi-edges, however this approach falls short because: i) averaging is well defined only for some groups and ii) the resulting estimator is less precise and accurate, as we prove empirically. Specifically, we present MULTISYNC, a synchronization algorithm for multi-graphs that is based on a principled constrained eigenvalue optimization. MULTISYNC is a general solution that can cope with any linear group and we show to be profitably usable both on synthetic and real problems.
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