Clusters, Orders, and Trees: Methods and Applications

Aleskerov, Fuad; Goldengorin, Boris; Pardalos, Pãnos M.

doi:10.1007/978-1-4939-0742-7

Cited by 6 publications

References 28 publications

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A Statistical Test of Heterogeneous Subgraph Densities to Assess Clusterability

Miasnikof

Prokhorenkova

Shestopaloff

et al. 2020

Lecture Notes in Computer Science

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Determining if a graph displays a clustered structure prior to subjecting it to any cluster detection technique has recently gained attention in the literature. Attempts to group graph vertices into clusters when a graph does not have a clustered structure is not only a waste of time but will also lead to misleading conclusions. To address this problem, we introduce a novel statistical test, the δ-test, which is based on comparisons of local and global densities. Our goal is to assess whether a given graph meets the necessary conditions to be meaningfully summarized by clusters of vertices. We empirically explore our test's behavior under a number of graph structures. We also compare it to other recently published tests. From a theoretical standpoint, our test is more general, versatile and transparent than recently published competing techniques. It is based on the examination of intuitive quantities, applies equally to weighted and unweighted graphs and allows comparisons across graphs. More importantly, it does not rely on any distributional assumptions, other than the universally accepted definition of a clustered graph. Empirically, our test is shown to be more responsive to graph structure than other competing tests.

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A Statistical Test of Heterogeneous Subgraph Densities to Assess Clusterability

Miasnikof

Prokhorenkova

Shestopaloff

et al. 2020

Lecture Notes in Computer Science

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Amharic Text Complexity Classification Using Supervised Machine Learning

Nigusie

Tegegne

2023

Lecture Notes of the Institute for Computer Sciences, Social Informatics and Telecommunications Engineering

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RMSC: Robust modeling of subspace clustering for high dimensional data

Radhika

et al. 2017

2017 International Conference on Advances in Computing, Communications and Informatics (ICACCI)

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Abstract-Subspace clustering is one of the active research problem associated with high-dimensional data. Here some of the standard techniques are reviewed to investigate existing methodologies. Although, there have been various forms of research techniques evolved recently, they do not completely mitigate the problems pertaining to noise sustainability and optimization of clustering accuracy. Hence, a novel technique called as Robust Modeling of Subspace Clustering (RMSC) presented to solve the above problem. An analytical research methodology is used to formulate two algorithms for computing outliers and for extracting elite subspace from the highdimensional data inflicted by different forms of noise. RMSC was found to offer higher accuracy and lower error rate both in presence of noise and absence of noise over high-dimensional data.

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Clusters, Orders, and Trees: Methods and Applications

Cited by 6 publications

References 28 publications

A Statistical Test of Heterogeneous Subgraph Densities to Assess Clusterability

A Statistical Test of Heterogeneous Subgraph Densities to Assess Clusterability

Amharic Text Complexity Classification Using Supervised Machine Learning

RMSC: Robust modeling of subspace clustering for high dimensional data

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