Given a matrix, the seriation problem consists in permuting its rows in such way that all its columns have the same shape, for example, they are monotone increasing. We propose a statistical approach to this problem where the matrix of interest is observed with noise and study the corresponding minimax rate of estimation of the matrices. Specifically, when the columns are either unimodal or monotone, we show that the least squares estimator is optimal up to logarithmic factors and adapts to matrices with a certain natural structure. Finally, we propose a computationally efficient estimator in the monotonic case and study its performance both theoretically and experimentally. Our work is at the intersection of shape constrained estimation an...
In the present paper we consider the problem of matrix completion with noise for general sampling sc...
Abstract. Consider the problem of estimating the entries of a large matrix, when the observed entrie...
The problem of finding a low rank approximation of a given measurement matrix is of key interest in ...
V2 corrects an error in Lemma A.1, v3 corrects appendix F on unimodal regression where the bounds no...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018.Cataloged fro...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
Models or signals exhibiting low dimensional behavior (e.g., sparse signals, low rank matrices) play...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
We analyze a class of estimators based on a convex relaxation for solving high-dimensional matrix de...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
The majority of methods for sparse precision matrix estimation rely on computationally expensive pro...
The matrix completion problem consists in reconstructing a matrix from a sample of entries, possibly...
Bayesian methods for low-rank matrix completion with noise have been shown to be very efficient comp...
67 pagesWe consider the twin problems of estimating the effective rank and the Schatten norms $\|{\b...
In the present paper we consider the problem of matrix completion with noise for general sampling sc...
Abstract. Consider the problem of estimating the entries of a large matrix, when the observed entrie...
The problem of finding a low rank approximation of a given measurement matrix is of key interest in ...
V2 corrects an error in Lemma A.1, v3 corrects appendix F on unimodal regression where the bounds no...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2018.Cataloged fro...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
Models or signals exhibiting low dimensional behavior (e.g., sparse signals, low rank matrices) play...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
We analyze a class of estimators based on a convex relaxation for solving high-dimensional matrix de...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
We consider the problem of estimating a low-rank signal matrix from noisy measurements under the ass...
The majority of methods for sparse precision matrix estimation rely on computationally expensive pro...
The matrix completion problem consists in reconstructing a matrix from a sample of entries, possibly...
Bayesian methods for low-rank matrix completion with noise have been shown to be very efficient comp...
67 pagesWe consider the twin problems of estimating the effective rank and the Schatten norms $\|{\b...
In the present paper we consider the problem of matrix completion with noise for general sampling sc...
Abstract. Consider the problem of estimating the entries of a large matrix, when the observed entrie...
The problem of finding a low rank approximation of a given measurement matrix is of key interest in ...