Sorensen, D.C.Embree, M.2018-06-192018-06-192014-07Sorensen, D.C. and Embree, M.. "A DEIM Induced CUR Factorization." (2014) <a href="https://hdl.handle.net/1911/102226">https://hdl.handle.net/1911/102226</a>.https://hdl.handle.net/1911/102226We derive a CUR matrix factorization based on the Discrete Empirical Interpolation Method (DEIM). For a given matrix A, such a factorization provides a low rank approximate decomposition of the form A ≈ CUR, where C and R are subsets of the columns and rows of A, and U is constructed to make CUR a good approximation. Given a low-rank singular value decomposition A ≈ VSWT, the DEIM procedure uses V and W to select the columns and rows of A that form C and R. Through an error analysis applicable to a general class of CUR factorizations, we show that the accuracy tracks the optimal approximation error within a factor that depends on the conditioning of submatrices of V and W. For large-scale problems, V and W can be approximated using an incremental QR algorithm that makes one pass through A. Numerical examples illustrate the favorable performance of the DEIM-CUR method, compared to CUR approximations based on leverage scores.30 ppengTechnical reportTR14-04