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National Repository of Grey Literature

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	Truncated total least squares method Michenková, Marie ; Dolejší, Vít (referee) ; Hnětynková, Iveta (advisor) Detailed record
	Numerical approximations of matrix functions Suchá, Darja ; Strakoš, Zdeněk (referee) ; Hnětynková, Iveta (advisor) Detailed record
	Continuation of an implicitly defined curve Nádhera, David ; Hnětynková, Iveta (referee) ; Janovský, Vladimír (advisor) Detailed record
	Krylov Subspace Approximations in Linear Algebraic Problems Hnětynková, Iveta ; Zítko, Jan (advisor) ; Dostál, Zdeněk (referee) ; Tichý, Petr (referee) Detailed record
	Noise revealing in Golub-Kahan bidiagonalization as a mean of regularization in discrete inverse problems Kubínová, Marie ; Hnětynková, Iveta Fulltext: content.csg - PDF Plný tet: 0425466 - PDF Detailed record
	Calculating the rank of the Sylvester matrix Kuřátko, J. ; Hnětynková, Iveta Detailed record
	Ill-posed inverse problems in image processing: introduction, structured matrices, spectral filtering, regularization, noise revealing Hnětynková, Iveta ; Plešinger, Martin ; Strakoš, Zdeněk Detailed record
	Total Least Squares Problem in Linear Algebraic Systems with Multiple Right-Hand Side Plešinger, Martin ; Hnětynková, Iveta ; Sima, D.M. ; Strakoš, Zdeněk Detailed record
	Golub-Kahan Iterative Bidiagonalization and Stopping Criteria in Ill-Posed Problems Hnětynková, Iveta ; Plešinger, Martin ; Strakoš, Zdeněk Detailed record
	Lanczošova třídiagonalizace, Golub-Kahanova bidiagonalizace a core problém Hnětynková, Iveta ; Strakoš, Zdeněk Consider an orthogonally invariant linear approximation problem Ax ~ b. In "C.C. Paige, Z. Strakoš: Core problems in linear algebraic systems (SIAM J. Matrix Anal. Appl. 27 (2006), pp. 861-875)" it was proved that the partial upper bidiagonalization of the matrix [b,A] determines a core approximation problem that contains the necessary and sufficient information for solving the original problem. Our contribution derives the fundamental characteristics of the core problem from the known relationship between the Golub-Kahan bidiagonalization, the Lanczos tridiagonalization and the properties of Jacobi matrices. Detailed record

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