Literature survey on low rank approximation of matrices
نویسندگان
چکیده
Low rank approximation of matrices has been well studied in literature. Singular value decomposition , QR decomposition with column pivoting, rank revealing QR factorization (RRQR), Interpolative decomposition etc are classical deterministic algorithms for low rank approximation. But these techniques are very expensive (O(n 3) operations are required for n × n matrices). There are several randomized algorithms available in the literature which are not so expensive as the classical techniques (but the complexity is not linear in n). So, it is very expensive to construct the low rank approximation of a matrix if the dimension of the matrix is very large. There are alternative techniques like Cross/Skeleton approximation which gives the low-rank approximation with linear complexity in n. In this article we review low rank approximation techniques briefly and give extensive references of many techniques.
منابع مشابه
A Fast Block Low-Rank Dense Solver with Applications to Finite-Element Matrices
1. Abstract. This article presents a fast dense solver for hierarchically off-diagonal low-rank (HODLR) matrices. This solver uses algebraic techniques such as the adaptive cross approximation (ACA) algorithm to construct the low-rank approximation of the off-diagonal matrix blocks. This allows us to apply the solver to any dense matrix that has an off-diagonal low-rank structure without any pr...
متن کاملExact Solutions in Structured Low-Rank Approximation
Structured low-rank approximation is the problem of minimizing a weighted Frobenius distance to a given matrix among all matrices of fixed rank in a linear space of matrices. We study the critical points of this optimization problem using algebraic geometry. A particular focus lies on Hankel matrices, Sylvester matrices and generic linear spaces.
متن کاملRandomized Algorithms for Low-Rank Matrix Decomposition
Low-rank matrix factorization is one of the most useful tools in scientific computing and data analysis. The goal of low-rank factorization is to decompose a matrix into a product of two smaller matrices of lower rank that approximates the original matrix well. Such a decomposition exposes the low-rank structure of the data, requires less storage, and subsequent matrix operations require less c...
متن کاملLow Rank Approximation using Error Correcting Coding Matrices
Low-rank matrix approximation is an integral component of tools such as principal component analysis (PCA), as well as is an important instrument used in applications like web search, text mining and computer vision, e.g., face recognition. Recently, randomized algorithms were proposed to effectively construct low rank approximations of large matrices. In this paper, we show how matrices from e...
متن کاملDynamical Low-Rank Approximation
For the low rank approximation of time-dependent data matrices and of solutions to matrix differential equations, an increment-based computational approach is proposed and analyzed. In this method, the derivative is projected onto the tangent space of the manifold of rank-r matrices at the current approximation. With an appropriate decomposition of rank-r matrices and their tangent matrices, th...
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ورودعنوان ژورنال:
- CoRR
دوره abs/1606.06511 شماره
صفحات -
تاریخ انتشار 2016