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Autores principales: De, Sourav, Chowdhury, Koustav, Mandal, Bibhabasu, Ghosh, Sagar, Das, Swagatam, Paul, Debolina, Chakraborty, Saptarshi
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2511.14784
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author De, Sourav
Chowdhury, Koustav
Mandal, Bibhabasu
Ghosh, Sagar
Das, Swagatam
Paul, Debolina
Chakraborty, Saptarshi
author_facet De, Sourav
Chowdhury, Koustav
Mandal, Bibhabasu
Ghosh, Sagar
Das, Swagatam
Paul, Debolina
Chakraborty, Saptarshi
contents Clustering approaches that utilize convex loss functions have recently attracted growing interest in the formation of compact data clusters. Although classical methods like k-means and its wide family of variants are still widely used, all of them require the number of clusters k to be supplied as input, and many are notably sensitive to initialization. Convex clustering provides a more stable alternative by formulating the clustering task as a convex optimization problem, ensuring a unique global solution. However, it faces challenges in handling high-dimensional data, especially in the presence of noise and outliers. Additionally, strong fusion regularization, controlled by the tuning parameter, can hinder effective cluster formation within a convex clustering framework. To overcome these challenges, we introduce a robust approach that integrates convex clustering with the Median of Means (MoM) estimator, thus developing an outlier-resistant and efficient clustering framework that does not necessitate prior knowledge of the number of clusters. By leveraging the robustness of MoM alongside the stability of convex clustering, our method enhances both performance and efficiency, especially on large-scale datasets. Theoretical analysis demonstrates weak consistency under specific conditions, while experiments on synthetic and real-world datasets validate the method's superior performance compared to existing approaches.
format Preprint
id arxiv_https___arxiv_org_abs_2511_14784
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Convex Clustering Redefined: Robust Learning with the Median of Means Estimator
De, Sourav
Chowdhury, Koustav
Mandal, Bibhabasu
Ghosh, Sagar
Das, Swagatam
Paul, Debolina
Chakraborty, Saptarshi
Machine Learning
Statistics Theory
Computation
Methodology
Clustering approaches that utilize convex loss functions have recently attracted growing interest in the formation of compact data clusters. Although classical methods like k-means and its wide family of variants are still widely used, all of them require the number of clusters k to be supplied as input, and many are notably sensitive to initialization. Convex clustering provides a more stable alternative by formulating the clustering task as a convex optimization problem, ensuring a unique global solution. However, it faces challenges in handling high-dimensional data, especially in the presence of noise and outliers. Additionally, strong fusion regularization, controlled by the tuning parameter, can hinder effective cluster formation within a convex clustering framework. To overcome these challenges, we introduce a robust approach that integrates convex clustering with the Median of Means (MoM) estimator, thus developing an outlier-resistant and efficient clustering framework that does not necessitate prior knowledge of the number of clusters. By leveraging the robustness of MoM alongside the stability of convex clustering, our method enhances both performance and efficiency, especially on large-scale datasets. Theoretical analysis demonstrates weak consistency under specific conditions, while experiments on synthetic and real-world datasets validate the method's superior performance compared to existing approaches.
title Convex Clustering Redefined: Robust Learning with the Median of Means Estimator
topic Machine Learning
Statistics Theory
Computation
Methodology
url https://arxiv.org/abs/2511.14784