6,363 research outputs found
A Survey on Soft Subspace Clustering
Subspace clustering (SC) is a promising clustering technology to identify
clusters based on their associations with subspaces in high dimensional spaces.
SC can be classified into hard subspace clustering (HSC) and soft subspace
clustering (SSC). While HSC algorithms have been extensively studied and well
accepted by the scientific community, SSC algorithms are relatively new but
gaining more attention in recent years due to better adaptability. In the
paper, a comprehensive survey on existing SSC algorithms and the recent
development are presented. The SSC algorithms are classified systematically
into three main categories, namely, conventional SSC (CSSC), independent SSC
(ISSC) and extended SSC (XSSC). The characteristics of these algorithms are
highlighted and the potential future development of SSC is also discussed.Comment: This paper has been published in Information Sciences Journal in 201
Low-Rank Matrices on Graphs: Generalized Recovery & Applications
Many real world datasets subsume a linear or non-linear low-rank structure in
a very low-dimensional space. Unfortunately, one often has very little or no
information about the geometry of the space, resulting in a highly
under-determined recovery problem. Under certain circumstances,
state-of-the-art algorithms provide an exact recovery for linear low-rank
structures but at the expense of highly inscalable algorithms which use nuclear
norm. However, the case of non-linear structures remains unresolved. We revisit
the problem of low-rank recovery from a totally different perspective,
involving graphs which encode pairwise similarity between the data samples and
features. Surprisingly, our analysis confirms that it is possible to recover
many approximate linear and non-linear low-rank structures with recovery
guarantees with a set of highly scalable and efficient algorithms. We call such
data matrices as \textit{Low-Rank matrices on graphs} and show that many real
world datasets satisfy this assumption approximately due to underlying
stationarity. Our detailed theoretical and experimental analysis unveils the
power of the simple, yet very novel recovery framework \textit{Fast Robust PCA
on Graphs
Probabilistic Sparse Subspace Clustering Using Delayed Association
Discovering and clustering subspaces in high-dimensional data is a
fundamental problem of machine learning with a wide range of applications in
data mining, computer vision, and pattern recognition. Earlier methods divided
the problem into two separate stages of finding the similarity matrix and
finding clusters. Similar to some recent works, we integrate these two steps
using a joint optimization approach. We make the following contributions: (i)
we estimate the reliability of the cluster assignment for each point before
assigning a point to a subspace. We group the data points into two groups of
"certain" and "uncertain", with the assignment of latter group delayed until
their subspace association certainty improves. (ii) We demonstrate that delayed
association is better suited for clustering subspaces that have ambiguities,
i.e. when subspaces intersect or data are contaminated with outliers/noise.
(iii) We demonstrate experimentally that such delayed probabilistic association
leads to a more accurate self-representation and final clusters. The proposed
method has higher accuracy both for points that exclusively lie in one
subspace, and those that are on the intersection of subspaces. (iv) We show
that delayed association leads to huge reduction of computational cost, since
it allows for incremental spectral clustering
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