English

Clustering with feature selection using alternating minimization, Application to computational biology

Machine Learning 2019-05-27 v4 Artificial Intelligence Machine Learning

Abstract

This paper deals with unsupervised clustering with feature selection. The problem is to estimate both labels and a sparse projection matrix of weights. To address this combinatorial non-convex problem maintaining a strict control on the sparsity of the matrix of weights, we propose an alternating minimization of the Frobenius norm criterion. We provide a new efficient algorithm named K-sparse which alternates k-means with projection-gradient minimization. The projection-gradient step is a method of splitting type, with exact projection on the 1\ell^1 ball to promote sparsity. The convergence of the gradient-projection step is addressed, and a preliminary analysis of the alternating minimization is made. The Frobenius norm criterion converges as the number of iterates in Algorithm K-sparse goes to infinity. Experiments on Single Cell RNA sequencing datasets show that our method significantly improves the results of PCA k-means, spectral clustering, SIMLR, and Sparcl methods, and achieves a relevant selection of genes. The complexity of K-sparse is linear in the number of samples (cells), so that the method scales up to large datasets.

Keywords

Cite

@article{arxiv.1711.02974,
  title  = {Clustering with feature selection using alternating minimization, Application to computational biology},
  author = {Cyprien Gilet and Marie Deprez and Jean-Baptiste Caillau and Michel Barlaud},
  journal= {arXiv preprint arXiv:1711.02974},
  year   = {2019}
}
R2 v1 2026-06-22T22:40:00.236Z