One of the central problems in machine learning and pattern recognition is to develop appropriate representations for complex data. We consider the problem of constructing a representation for data lying on a low-dimensional manifold embedded in a high-dimensional space. Drawing on the correspondence between the graph Laplacian, the Laplace Beltrami operator on the manifold, and the connections to the heat equation, we propose a geometrically motivated algorithm for representing the high-dimensional data. The algorithm provides a computationally efficient ap-proach to nonlinear dimensionality reduction that has locality-preserving properties and a natural connection to clustering. Some potential appli-cations and illustrative examples are d...
Manifold learning is a powerful tool for solving nonlinear dimension reduction problems. By assuming...
In this thesis, we investigate the problem of obtaining meaningful low dimensional representation of...
With Laplacian eigenmaps the low-dimensional manifold of high-dimensional data points can be uncover...
One of the central problems in machine learning and pattern recognition is to develop appropriate re...
One of the central problems in machine learning and pattern recognition is to develop appropriate r...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
This thesis deals with the rigorous application of nonlinear dimension reduc-tion and data organizat...
2020 Summer.Includes bibliographical references.With "Big Data" becoming more available in our day-t...
In recent years, manifold learning has become increasingly popular as a tool for performing non-line...
We interpret several well-known algorithms for dimensionality reduction of manifolds as kernel metho...
We interpret several well-known algorithms for dimensionality reduction of manifolds as kernel meth...
This is the final project report for CPS2341. In this paper, we study several re-cently developed ma...
Thesis (Ph.D.)--University of Washington, 2013In this work, we explore and exploit the use of differ...
We study the problem of discovering a manifold that best preserves information relevant to a nonline...
High-dimensional data representation is an important problem in many different areas of science. Now...
Manifold learning is a powerful tool for solving nonlinear dimension reduction problems. By assuming...
In this thesis, we investigate the problem of obtaining meaningful low dimensional representation of...
With Laplacian eigenmaps the low-dimensional manifold of high-dimensional data points can be uncover...
One of the central problems in machine learning and pattern recognition is to develop appropriate re...
One of the central problems in machine learning and pattern recognition is to develop appropriate r...
Manifold learning is a popular recent approach to nonlinear dimensionality reduction. Algorithms for...
This thesis deals with the rigorous application of nonlinear dimension reduc-tion and data organizat...
2020 Summer.Includes bibliographical references.With "Big Data" becoming more available in our day-t...
In recent years, manifold learning has become increasingly popular as a tool for performing non-line...
We interpret several well-known algorithms for dimensionality reduction of manifolds as kernel metho...
We interpret several well-known algorithms for dimensionality reduction of manifolds as kernel meth...
This is the final project report for CPS2341. In this paper, we study several re-cently developed ma...
Thesis (Ph.D.)--University of Washington, 2013In this work, we explore and exploit the use of differ...
We study the problem of discovering a manifold that best preserves information relevant to a nonline...
High-dimensional data representation is an important problem in many different areas of science. Now...
Manifold learning is a powerful tool for solving nonlinear dimension reduction problems. By assuming...
In this thesis, we investigate the problem of obtaining meaningful low dimensional representation of...
With Laplacian eigenmaps the low-dimensional manifold of high-dimensional data points can be uncover...