Journal PaperMany types of data and information can be described by concise models that suggest each data vector (or signal) actually has â few degrees of freedomâ relative to its size N. This is the motivation for a variety of dimensionality reduction techniques for data processing that attempt to reduce or eliminate the impact of the ambient dimension N on computational or storage requirements. As an example, many signals can be expressed as a sparse linear combination of elements from some dictionary. The sparsity of the representation directly reflects the conciseness of the model and permits efficient techniques such as Compressed Sensing (CS), an emerging theory for sparse signal recovery requiring only a small number of nonadaptiv...
Originally motivated by computational considerations, we demonstrate how computational efficient and...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
We introduce an information theoretic method for nonparametric, nonlinear dimensionality reduction, ...
Conference PaperRandom projections have recently found a surprising niche in signal processing. The ...
We propose a novel method for linear dimensionality reduction of manifold modeled data. First, we sh...
Models in signal processing often deal with some notion of structure or conciseness suggesting that ...
We compare and contrast from a geometric perspective a number of low-dimensional signal models that ...
Abstract—A novel approach is developed for nonlinear compression and reconstruction of high- or even...
This thesis concerns the problem of dimensionality reduction through information geometric methods o...
The restricted isometry property (RIP) is at the center of important developments in compressive sen...
The subject at hand is the dimensionality reduction of statistical manifolds by the use of informati...
The emergence of low-cost sensor architectures for diverse modalities has made it possible to deploy...
<p>Subspaces and manifolds are two powerful models for high dimensional signals. Subspaces model lin...
Abstract—Nonparametric Bayesian methods are employed to constitute a mixture of low-rank Gaussians, ...
We propose a framework for exploiting dimension-reducing random projections in detection and classif...
Originally motivated by computational considerations, we demonstrate how computational efficient and...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
We introduce an information theoretic method for nonparametric, nonlinear dimensionality reduction, ...
Conference PaperRandom projections have recently found a surprising niche in signal processing. The ...
We propose a novel method for linear dimensionality reduction of manifold modeled data. First, we sh...
Models in signal processing often deal with some notion of structure or conciseness suggesting that ...
We compare and contrast from a geometric perspective a number of low-dimensional signal models that ...
Abstract—A novel approach is developed for nonlinear compression and reconstruction of high- or even...
This thesis concerns the problem of dimensionality reduction through information geometric methods o...
The restricted isometry property (RIP) is at the center of important developments in compressive sen...
The subject at hand is the dimensionality reduction of statistical manifolds by the use of informati...
The emergence of low-cost sensor architectures for diverse modalities has made it possible to deploy...
<p>Subspaces and manifolds are two powerful models for high dimensional signals. Subspaces model lin...
Abstract—Nonparametric Bayesian methods are employed to constitute a mixture of low-rank Gaussians, ...
We propose a framework for exploiting dimension-reducing random projections in detection and classif...
Originally motivated by computational considerations, we demonstrate how computational efficient and...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
We introduce an information theoretic method for nonparametric, nonlinear dimensionality reduction, ...