This paper presents a generalized incremental Laplacian Eigenmaps (GENILE), a novel online version of the Laplacian Eigenmaps, one of the most popular manifold-based dimensionality reduction techniques which solves the generalized eigenvalue problem. We evaluate the comparative performance of the manifold-based learning techniques using both artificial and real data. Specifically, two popular artificial datasets: swiss roll and s-curve datasets, are used, in addition to real MNIST digits, bank-note and heart disease datasets for testing and evaluating our novel method benchmarked against a number of standard batch-based and other manifold-based learning techniques. Preliminary experimental results demonstrate consistent improvements in the ...
One of the central problems in machine learning and pattern recognition is to develop appropriate r...
Dimension reduction is a research hotspot in recent years, especially manifold learning for high-dim...
The need to reduce the dimensionality of a dataset whilst retaining its inherent manifold structure ...
This paper presents a generalized incremental Laplacian Eigenmaps (GENILE), a novel online version o...
Feature extraction is an extremely important pre-processing step to pattern recognition, and machine...
Abstract. Dimensionality reduction is a key stage for both the design of a pat-tern recognition syst...
With Laplacian eigenmaps the low-dimensional manifold of high-dimensional data points can be uncover...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
Manifold learning techniques have been widely used to produce low-dimensional representations of pat...
Abstract: We review the ideas, algorithms, and numerical performance of manifold-based machine learn...
Abstract. In this paper we propose a novel non-linear discriminative analysis technique for manifold...
In the current work, linear and non-linear manifold learning techniques, specifically Principle Comp...
This is the final project report for CPS2341. In this paper, we study several re-cently developed ma...
In this thesis, we investigate the problem of obtaining meaningful low dimensional representation of...
This thesis deals with the rigorous application of nonlinear dimension reduc-tion and data organizat...
One of the central problems in machine learning and pattern recognition is to develop appropriate r...
Dimension reduction is a research hotspot in recent years, especially manifold learning for high-dim...
The need to reduce the dimensionality of a dataset whilst retaining its inherent manifold structure ...
This paper presents a generalized incremental Laplacian Eigenmaps (GENILE), a novel online version o...
Feature extraction is an extremely important pre-processing step to pattern recognition, and machine...
Abstract. Dimensionality reduction is a key stage for both the design of a pat-tern recognition syst...
With Laplacian eigenmaps the low-dimensional manifold of high-dimensional data points can be uncover...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
Manifold learning techniques have been widely used to produce low-dimensional representations of pat...
Abstract: We review the ideas, algorithms, and numerical performance of manifold-based machine learn...
Abstract. In this paper we propose a novel non-linear discriminative analysis technique for manifold...
In the current work, linear and non-linear manifold learning techniques, specifically Principle Comp...
This is the final project report for CPS2341. In this paper, we study several re-cently developed ma...
In this thesis, we investigate the problem of obtaining meaningful low dimensional representation of...
This thesis deals with the rigorous application of nonlinear dimension reduc-tion and data organizat...
One of the central problems in machine learning and pattern recognition is to develop appropriate r...
Dimension reduction is a research hotspot in recent years, especially manifold learning for high-dim...
The need to reduce the dimensionality of a dataset whilst retaining its inherent manifold structure ...