Author:
Martinsson Per-Gunnar,Tropp Joel A.
Abstract
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizing matrices and solving linear systems. It focuses on techniques that have a proven track record for real-world problems. The paper treats both the theoretical foundations of the subject and practical computational issues.Topics include norm estimation, matrix approximation by sampling, structured and unstructured random embeddings, linear regression problems, low-rank approximation, subspace iteration and Krylov methods, error estimation and adaptivity, interpolatory and CUR factorizations, Nyström approximation of positive semidefinite matrices, single-view (‘streaming’) algorithms, full rank-revealing factorizations, solvers for linear systems, and approximation of kernel matrices that arise in machine learning and in scientific computing.
Publisher
Cambridge University Press (CUP)
Subject
General Mathematics,Numerical Analysis
Reference301 articles.
1. Melgaard, C. and Gu, M. (2015), Gaussian elimination with randomized complete pivoting. arXiv:1511.08528
2. Martinsson, P.-G. , Rokhlin, V. and Tygert, M. (2006 a), A randomized algorithm for the approximation of matrices. Yale CS research report YALEU/DCS/RR-1361, Computer Science Department, Yale University.
3. Vershynin, R. (2019), Concentration inequalities for random tensors. arXiv:1905.00802
4. Ballard, G. , Demmel, J. , Dumitriu, I. and Rusciano, A. (2019), A generalized randomized rank-revealing factorization. arXiv:1909.06524
5. A stochastic estimator of the trace of the influence matrix for laplacian smoothing splines
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