We introduce a new perspective on spectral dimensionality reduction which views these methods as Gaussian Markov random fields (GRFs). Our unifying perspective is based on the maximum entropy principle which is in turn inspired by maximum variance unfolding. The resulting model, which we call maximum entropy unfolding (MEU) is a nonlinear generalization of principal component analysis. We relate the model to Laplacian eigenmaps and isomap. We show that parameter fitting in the locally linear embedding (LLE) is approximate maximum likelihood MEU. We introduce a variant of LLE that performs maximum likelihood exactly: Acyclic LLE (ALLE). We show that MEU and ALLE are competitive with the leading spectral approaches on a robot navigation visua...
Abstract- In this paper, we combined the applica-tion of a non-linear dimensionality reduction tech-...
There are many successful spectral based unsupervised dimensionality reduction methods, including L...
Abstract—Over the past few decades, dimensionality reduction has been widely exploited in computer v...
We introduce a new perspective on spectral dimensionality reduction which views these methods as Gau...
AbstractNowadays, one of the most changeling points in statistics is the analysis of high dimensiona...
Humans as well as humanoid robots can use a large number of degrees of freedom to solve very complex...
Locally Linear Embedding (LLE) is a nonlinear spectral dimensionality reduction and manifold learnin...
We propose a framework for learning hidden-variable models by optimizing entropies, in which entropy...
Abstract — Humans as well as humanoid robots can use a large number of degrees of freedom to solve v...
This is a tutorial and survey paper on unification of spectral dimensionality reduction methods, ker...
In this thesis we develop a spectral approach to large kernel matrices, graphs and the Hessians of n...
International audienceThis paper addresses the problem of dimension reduction of noisy data, more pr...
We present a novel approach for the reconstruction of spectra from Euclidean correlator data that ma...
The last few years have seen a great increase in the amount of data available to scientists. Dataset...
ber of non-linear dimensionality reduction techniques (manifold learners) have been proposed. Many o...
Abstract- In this paper, we combined the applica-tion of a non-linear dimensionality reduction tech-...
There are many successful spectral based unsupervised dimensionality reduction methods, including L...
Abstract—Over the past few decades, dimensionality reduction has been widely exploited in computer v...
We introduce a new perspective on spectral dimensionality reduction which views these methods as Gau...
AbstractNowadays, one of the most changeling points in statistics is the analysis of high dimensiona...
Humans as well as humanoid robots can use a large number of degrees of freedom to solve very complex...
Locally Linear Embedding (LLE) is a nonlinear spectral dimensionality reduction and manifold learnin...
We propose a framework for learning hidden-variable models by optimizing entropies, in which entropy...
Abstract — Humans as well as humanoid robots can use a large number of degrees of freedom to solve v...
This is a tutorial and survey paper on unification of spectral dimensionality reduction methods, ker...
In this thesis we develop a spectral approach to large kernel matrices, graphs and the Hessians of n...
International audienceThis paper addresses the problem of dimension reduction of noisy data, more pr...
We present a novel approach for the reconstruction of spectra from Euclidean correlator data that ma...
The last few years have seen a great increase in the amount of data available to scientists. Dataset...
ber of non-linear dimensionality reduction techniques (manifold learners) have been proposed. Many o...
Abstract- In this paper, we combined the applica-tion of a non-linear dimensionality reduction tech-...
There are many successful spectral based unsupervised dimensionality reduction methods, including L...
Abstract—Over the past few decades, dimensionality reduction has been widely exploited in computer v...