Dimensionality reduction is ubiquitous in biomedical applications. A newly proposed spectral dimensionality reduction method, named kernel entropy component analysis (KECA), can reveal the structure related to Renyi entropy of an input space data set. However, each principal component in the Hilbert space depends on all training samples in KECA, causing degraded performance. To overcome this drawback, a sparse KECA (SKECA) algorithm based on a recursive divide-and-conquer (DC) method is proposed in this work. The original large and complex problem of KECA is decomposed into a series of small and simple sub-problems, and then they are solved recursively. The performance of SKECA is evaluated on four biomedical datasets, and compared with KEC...
This paper presents gradKCCA, a large-scale sparse non-linear canonical correlation method. Like Ker...
Background: High-throughput genomic and proteomic data have important applications in medicine inclu...
The aim of this paper is to present basic principles of common multivariate statistical approaches t...
Kernel entropy component analysis (KECA) is a newly proposed dimensionality reduction (DR) method, w...
We introduce Feature Dependent Kernel Entropy Component Analysis (FDKECA) as a new extension to Kern...
We introduce Feature Dependent Kernel Entropy Component Analysis (FDKECA) as a new extension to Kern...
In order to solve the problem that principal component analysis (PCA) algorithm can??t deal with the...
Kernel discriminant analysis (KDA) is one of the most effective nonlinear techniques for dimensional...
• Coefficients are mostly zeros and the computational complexity is high • Inspired by [3], a new L0...
Dimensionality reduction (DR) aims to reveal salient properties of high-dimensional (HD) data in a l...
We study the use of kernel subspace methods for learning low-dimensional representations for classif...
A fast algorithm, Accelerated Kernel Feature Analysis (AKFA), that discovers salient features eviden...
We study the use of kernel subspace methods that learn low-dimensional subspace representations for ...
Various dimensionality reduction (DR) schemes have been developed for projecting high-dimensional da...
The subspace method of pattern recognition is a classification technique in which pattern classes ar...
This paper presents gradKCCA, a large-scale sparse non-linear canonical correlation method. Like Ker...
Background: High-throughput genomic and proteomic data have important applications in medicine inclu...
The aim of this paper is to present basic principles of common multivariate statistical approaches t...
Kernel entropy component analysis (KECA) is a newly proposed dimensionality reduction (DR) method, w...
We introduce Feature Dependent Kernel Entropy Component Analysis (FDKECA) as a new extension to Kern...
We introduce Feature Dependent Kernel Entropy Component Analysis (FDKECA) as a new extension to Kern...
In order to solve the problem that principal component analysis (PCA) algorithm can??t deal with the...
Kernel discriminant analysis (KDA) is one of the most effective nonlinear techniques for dimensional...
• Coefficients are mostly zeros and the computational complexity is high • Inspired by [3], a new L0...
Dimensionality reduction (DR) aims to reveal salient properties of high-dimensional (HD) data in a l...
We study the use of kernel subspace methods for learning low-dimensional representations for classif...
A fast algorithm, Accelerated Kernel Feature Analysis (AKFA), that discovers salient features eviden...
We study the use of kernel subspace methods that learn low-dimensional subspace representations for ...
Various dimensionality reduction (DR) schemes have been developed for projecting high-dimensional da...
The subspace method of pattern recognition is a classification technique in which pattern classes ar...
This paper presents gradKCCA, a large-scale sparse non-linear canonical correlation method. Like Ker...
Background: High-throughput genomic and proteomic data have important applications in medicine inclu...
The aim of this paper is to present basic principles of common multivariate statistical approaches t...