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引用次数: 7

摘要

本文研究了群不变子空间聚类问题,假设数据来自向量空间的群不变子空间的并,即对给定群的作用不变的子空间。在代数上,这样的群不变子空间也被称为子模块。类似于众所周知的稀疏子空间聚类方法(假设数据来自子空间的并集),我们分析了一种算法,根据最近的工作[1],我们称之为稀疏子模块聚类(SSmC)。该方法基于寻找数据点的群稀疏自表示。本文首先给出了群不变子空间辨识可能存在的一般条件。特别地,我们扩展了[2]中的几何分析,并在此过程中发现了几何泛函分析中的一个相关问题。
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Group-invariant Subspace Clustering
In this paper we consider the problem of group-invariant subspace clustering where the data is assumed to come from a union of group-invariant subspaces of a vector space, i.e. subspaces which are invariant with respect to action of a given group. Algebraically, such group-invariant subspaces are also referred to as submodules. Similar to the well known Sparse Subspace Clustering approach where the data is assumed to come from a union of subspaces, we analyze an algorithm which, following a recent work [1], we refer to as Sparse Sub-module Clustering (SSmC). The method is based on finding group-sparse self-representation of data points. In this paper we primarily derive general conditions under which such a group-invariant subspace identification is possible. In particular we extend the geometric analysis in [2] and in the process we identify a related problem in geometric functional analysis.
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