Extracting low dimensional structure from high dimensional data arises in many applications such as machine learning, statistical pattern recognition, wireless sensor networks, and data compression. If the data is restricted to a lower dimensional subspace, then simple algorithms using linear projections can find the subspace and consequently estimate its dimensionality. However, if the data lies on a low dimensional but nonlinear space (e.g., manifolds), then its structure may be highly nonlinear and hence linear methods are doomed to fail. In this paper we introduce a new technique for dimensionality reduction based on point-wise operators. More precisely, let $\mathbf{A}_{n\times n}$ be a matrix of rank $k\ll n$ and assume that the matri...
We study the frequent problem of approximating a target matrix with a matrix of lower rank. We provi...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
A general, {\em rectangular} kernel matrix may be defined as $K_{ij} = \kappa(x_i,y_j)$ where $\kapp...
The problem of extracting low dimensional structure from high dimensional data arises in many applic...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2007.Includes bibliogr...
Fitting data by a bounded complexity linear model is equivalent to low-rank approximation of a matri...
University of Minnesota Ph.D. disseration. May 2014. Major: Computer Science. Advisor: Youcef Saad. ...
Low-dimensional statistics of measurements play an important role in detection problems, including t...
Low-rank approximation plays an important role in many areas of science and engineering such as sign...
Abstract—The low-rank approximation problem is to approx-imate optimally, with respect to some norm,...
This paper develops a suite of algorithms for constructing low-rank approximations of an input matri...
AbstractThis paper concerns the construction of a structured low rank matrix that is nearest to a gi...
Low-rank matrix estimation arises in a number of statistical and machine learning tasks. In particul...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
We consider the problem of recovering an unknown low-rank matrix X with (possibly) non-orthogonal, e...
We study the frequent problem of approximating a target matrix with a matrix of lower rank. We provi...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
A general, {\em rectangular} kernel matrix may be defined as $K_{ij} = \kappa(x_i,y_j)$ where $\kapp...
The problem of extracting low dimensional structure from high dimensional data arises in many applic...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2007.Includes bibliogr...
Fitting data by a bounded complexity linear model is equivalent to low-rank approximation of a matri...
University of Minnesota Ph.D. disseration. May 2014. Major: Computer Science. Advisor: Youcef Saad. ...
Low-dimensional statistics of measurements play an important role in detection problems, including t...
Low-rank approximation plays an important role in many areas of science and engineering such as sign...
Abstract—The low-rank approximation problem is to approx-imate optimally, with respect to some norm,...
This paper develops a suite of algorithms for constructing low-rank approximations of an input matri...
AbstractThis paper concerns the construction of a structured low rank matrix that is nearest to a gi...
Low-rank matrix estimation arises in a number of statistical and machine learning tasks. In particul...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
We consider the problem of recovering an unknown low-rank matrix X with (possibly) non-orthogonal, e...
We study the frequent problem of approximating a target matrix with a matrix of lower rank. We provi...
This thesis shows how we can exploit low-dimensional structure in high-dimensional statistics and ma...
A general, {\em rectangular} kernel matrix may be defined as $K_{ij} = \kappa(x_i,y_j)$ where $\kapp...