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Results:
1-8
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Results: 8
Authors:
ELSNER L
NABBEN R
NEUMANN M
Citation: L. Elsner et al., ORTHOGONAL BASES THAT LEAD TO SYMMETRICAL NONNEGATIVE MATRICES, Linear algebra and its applications, 271, 1998, pp. 323-343
Authors:
NABBEN R
Citation: R. Nabben, Z-MATRICES AND INVERSE Z-MATRICES, Linear algebra and its applications, 256, 1997, pp. 31-48
Authors:
FRIEDLAND S
NABBEN R
Citation: S. Friedland et R. Nabben, ON THE 2ND REAL EIGENVALUE OF NONNEGATIVE AND Z-MATRICES, Linear algebra and its applications, 255, 1997, pp. 303-313
Authors:
NABBEN R
Citation: R. Nabben, A NOTE ON COMPARISON-THEOREMS FOR SPLITTINGS AND MULTISPLITTINGS OF HERMITIAN POSITIVE-DEFINITE MATRICES, Linear algebra and its applications, 233, 1996, pp. 67-80
Authors:
NABBEN R
VARGA RS
Citation: R. Nabben et Rs. Varga, ON CLASSES OF INVERSE Z-MATRICES, Linear algebra and its applications, 224, 1995, pp. 521-552
Authors:
NABBEN R
VARGA RS
Citation: R. Nabben et Rs. Varga, GENERALIZED ULTRAMETRIC MATRICES - A CLASS OF INVERSE M-MATRICES, Linear algebra and its applications, 220, 1995, pp. 365-390
Authors:
NABBEN R
VARGA RS
Citation: R. Nabben et Rs. Varga, A LINEAR ALGEBRA PROOF THAT THE INVERSE OF A STRICTLY ULTRAMETRIC MATRIX IS A STRICTLY DIAGONALLY DOMINANT STIELTJES MATRIX, SIAM journal on matrix analysis and applications, 15(1), 1994, pp. 107-113
Authors:
VARGA RS
NABBEN R
Citation: Rs. Varga et R. Nabben, AN ALGORITHM FOR DETERMINING IF THE INVERSE OF A STRICTLY DIAGONALLY DOMINANT STIELTJES MATRIX IS STRICTLY ULTRAMETRIC, Numerische Mathematik, 65(4), 1993, pp. 493-501
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1-8
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