We found a match
Your institution may have access to this item. Find your institution then sign in to continue.
- Title
A Linearly Involved Generalized Moreau Enhancement of ℓ 2,1 -Norm with Application to Weighted Group Sparse Classification.
- Authors
Chen, Yang; Yamagishi, Masao; Yamada, Isao
- Abstract
This paper proposes a new group-sparsity-inducing regularizer to approximate ℓ 2 , 0 pseudo-norm. The regularizer is nonconvex, which can be seen as a linearly involved generalized Moreau enhancement of ℓ 2 , 1 -norm. Moreover, the overall convexity of the corresponding group-sparsity-regularized least squares problem can be achieved. The model can handle general group configurations such as weighted group sparse problems, and can be solved through a proximal splitting algorithm. Among the applications, considering that the bias of convex regularizer may lead to incorrect classification results especially for unbalanced training sets, we apply the proposed model to the (weighted) group sparse classification problem. The proposed classifier can use the label, similarity and locality information of samples. It also suppresses the bias of convex regularizer-based classifiers. Experimental results demonstrate that the proposed classifier improves the performance of convex ℓ 2 , 1 regularizer-based methods, especially when the training data set is unbalanced. This paper enhances the potential applicability and effectiveness of using nonconvex regularizers in the frame of convex optimization.
- Subjects
ALGORITHMS; CLASSIFICATION
- Publication
Algorithms, 2021, Vol 14, Issue 11, p312
- ISSN
1999-4893
- Publication type
Article
- DOI
10.3390/a14110312