In this thesis, we study two methods that can be used to learn, infer, and unmix weak, structured signals in noise: the Dynamic Mode Decomposition algorithm and the sparse Principal Component Analysis problem. Both problems take as input samples of a multivariate signal that is corrupted by noise, and produce a set of structured signals. We present performance guarantees for each algorithm and validate our findings with numerical simulations. First, we study the Dynamic Mode Decomposition (DMD) algorithm. We demonstrate that DMD can be used to solve the source separation problem. That is, we apply DMD to a data matrix whose rows are linearly independent, additive mixtures of latent time series. We show that when the latent time series are ...
Engineering: 1st Place (The Ohio State University Edward F. Hayes Graduate Research Forum)We report ...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
We provide a new robust convergence analysis of the well-known power method for computing the domina...
Data in statistical signal processing problems is often inherently matrix-valued, and a natural firs...
The estimation of low rank signals in noise is a ubiquitous task in signal processing, communication...
Modern measurement systems monitor a growing number of variables at low cost. In the problem of cha...
Modern data analysis increasingly involves extracting insights, trends and patterns from large and m...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
We analyze blind separation of independent sources in the face of additive noise. The analysis is ca...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
This paper studies the recursive robust principal components analysis problem. If the outlier is the...
With the fast development of networking, data storage, and the data collection capacity, big data ar...
University of Minnesota Ph.D. dissertation.June 2017. Major: Electrical/Computer Engineering. Adviso...
The dynamic mode decomposition (DMD) extracted dynamic modes are the non-orthogonal eigenvectors of ...
We study the reconstruction of continuous chaotic attractors from noisy time-series. A method of del...
Engineering: 1st Place (The Ohio State University Edward F. Hayes Graduate Research Forum)We report ...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
We provide a new robust convergence analysis of the well-known power method for computing the domina...
Data in statistical signal processing problems is often inherently matrix-valued, and a natural firs...
The estimation of low rank signals in noise is a ubiquitous task in signal processing, communication...
Modern measurement systems monitor a growing number of variables at low cost. In the problem of cha...
Modern data analysis increasingly involves extracting insights, trends and patterns from large and m...
The object of this thesis is the study of constrained measurement systems of signals having low-dime...
We analyze blind separation of independent sources in the face of additive noise. The analysis is ca...
How do statistical dependencies in measurement noise influence high-dimensional inference? To answer...
This paper studies the recursive robust principal components analysis problem. If the outlier is the...
With the fast development of networking, data storage, and the data collection capacity, big data ar...
University of Minnesota Ph.D. dissertation.June 2017. Major: Electrical/Computer Engineering. Adviso...
The dynamic mode decomposition (DMD) extracted dynamic modes are the non-orthogonal eigenvectors of ...
We study the reconstruction of continuous chaotic attractors from noisy time-series. A method of del...
Engineering: 1st Place (The Ohio State University Edward F. Hayes Graduate Research Forum)We report ...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
We provide a new robust convergence analysis of the well-known power method for computing the domina...