In this brief, kernel principal component analysis (KPCA) is reinterpreted as the solution to a convex optimization problem. Actually, there is a constrained convex problem for each principal component, so that the constraints guarantee that the principal component is indeed a solution, and not a mere saddle point. Although these insights do not imply any algorithmic improvement, they can be used to further understand the method, formulate possible extensions, and properly address them. As an example, a new convex optimization problem for semisupervised classification is proposed, which seems particularly well suited whenever the number of known labels is small. Our formulation resembles a least squares support vector machine problem with a...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Though there is a growing literature on fairness for supervised learning, incorporating fairness int...
In this paper, we discuss methods to refine locally optimal solutions of sparse PCA. Starting from a...
Principal Component Analysis (PCA) finds the best linear representation of data, and is an indispens...
Principal component analysis (PCA) finds the best linear representation of data and is an indispensa...
Regularized kernel discriminant analysis (RKDA) performs linear discriminant analysis in the fea-tur...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
Recently, supervised dimensionality reduction has been gaining attention, owing to the realization t...
Principal Component Analysis (PCA) finds the best linear representation for data and is an indispens...
In the last decade, kernel-based learning has become a state-of-the-art technol-ogy in Machine Learn...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
Many Kernel Learning Algorithms(KLA), including Support Vector Machine (SVM), result in a Kernel Mac...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised le...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Though there is a growing literature on fairness for supervised learning, incorporating fairness int...
In this paper, we discuss methods to refine locally optimal solutions of sparse PCA. Starting from a...
Principal Component Analysis (PCA) finds the best linear representation of data, and is an indispens...
Principal component analysis (PCA) finds the best linear representation of data and is an indispensa...
Regularized kernel discriminant analysis (RKDA) performs linear discriminant analysis in the fea-tur...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
Recently, supervised dimensionality reduction has been gaining attention, owing to the realization t...
Principal Component Analysis (PCA) finds the best linear representation for data and is an indispens...
In the last decade, kernel-based learning has become a state-of-the-art technol-ogy in Machine Learn...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
Many Kernel Learning Algorithms(KLA), including Support Vector Machine (SVM), result in a Kernel Mac...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised le...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Though there is a growing literature on fairness for supervised learning, incorporating fairness int...
In this paper, we discuss methods to refine locally optimal solutions of sparse PCA. Starting from a...