Add to ORKGMatrix completion has attracted significant recent attention in many fields including statistics, applied mathematics, and electrical engineering. Current literature on matrix completion focuses primarily on independent sampling models under which the individual observed entries are sampled independently. Motivated by applications in genomic data integration, we propose a new framework of structured matrix completion (SMC) to treat structured missingness by design. Specifically, our proposed method aims at efficient matrix recovery when a subset of the rows and columns of an approximately low-rank matrix are observed. We provide theoretical justification for the proposed SMC method and derive lower bound for the estimation errors, which tog...
Motivation: Single-cell RNA sequencing has been proved to be revolutionary for its potential of zoom...
In this dissertation, I have developed several high dimensional inferences and computational methods...
•Matrix completion recover a matrix M ∈ Rd1×d2 from incomplete observations. •Low-rank matrix: (i) e...
Matrix completion has attracted significant recent attention in many fields including statistics, ap...
This thesis investigates matrix completion algorithms with applications in biomedicine, e-commerce a...
Background An exponential growth of high-throughput biological information and data has occurred in...
Genome-wide association studies present computational challenges for missing data imputation, while ...
Often, data organized in matrix form contains missing entries. Further, such data has been observed...
146 pagesThe problem of Matrix Completion has been widely studied over the past decade. However, the...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
The problem of finding the missing values of a matrix given a few of its entries, called matrix comp...
University of Minnesota Ph.D. dissertation. May 2015. Major: Electrical/Computer Engineering. Advis...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
Handling incomplete or missing data is a common aspect of modern statistical methods. In this thesis...
Structured matrices refer to matrix valued data that are embedded in an inherent lower dimensional ...
Motivation: Single-cell RNA sequencing has been proved to be revolutionary for its potential of zoom...
In this dissertation, I have developed several high dimensional inferences and computational methods...
•Matrix completion recover a matrix M ∈ Rd1×d2 from incomplete observations. •Low-rank matrix: (i) e...
Matrix completion has attracted significant recent attention in many fields including statistics, ap...
This thesis investigates matrix completion algorithms with applications in biomedicine, e-commerce a...
Background An exponential growth of high-throughput biological information and data has occurred in...
Genome-wide association studies present computational challenges for missing data imputation, while ...
Often, data organized in matrix form contains missing entries. Further, such data has been observed...
146 pagesThe problem of Matrix Completion has been widely studied over the past decade. However, the...
Estimation of inverse covariance matrices, known as precision matrices, is important in various area...
The problem of finding the missing values of a matrix given a few of its entries, called matrix comp...
University of Minnesota Ph.D. dissertation. May 2015. Major: Electrical/Computer Engineering. Advis...
We propose a general framework for reconstructing and denoising single entries of incomplete and noi...
Handling incomplete or missing data is a common aspect of modern statistical methods. In this thesis...
Structured matrices refer to matrix valued data that are embedded in an inherent lower dimensional ...
Motivation: Single-cell RNA sequencing has been proved to be revolutionary for its potential of zoom...
In this dissertation, I have developed several high dimensional inferences and computational methods...
•Matrix completion recover a matrix M ∈ Rd1×d2 from incomplete observations. •Low-rank matrix: (i) e...