| EXTREME PRESERVERS OF FUZZY MATRIX PAIRS DERIVED FROM ZERO-TERM RANK INEQUALITIES |
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Song, Seok-Zun
(Department of Mathematics, Jeju National University)
Park, Eun-A (Department of Mathematics, Jeju National University) |
| 1 | L. B. Beasley, A. E. Guterman, Y. B. Jun and S. Z. Song, Linear preservers of extremes of rank inequalities over semirings: Row and Column ranks, Linear Algebra Appl., 413(2006), 495-509. DOI ScienceOn |
| 2 | L. B. Beasley, S. G. Lee, and S. Z. Song, Linear operators that preserve pairs of matrices which satisfy extreme rank properties, Linear ALgebra Appl. 350 (2002), 263-272. DOI ScienceOn |
| 3 | L. B. Beasley, S. G. Lee, S. Z. Song, Linear operators that preserve zero-term rank of Boolean matrices, J. Korean Math. Soc., 36 (1999), 1181-1190. 과학기술학회마을 |
| 4 | P. Pierce and others, A Survey of Linear Preserver Problems, Linear and Multi-linear Algebra, 33 (1992), 1-119. DOI ScienceOn |
| 5 | S. Z. Song, Topics on linear preserver problems - a brief introduction (Korean), Commun. Korean Math. Soc., 21 (2006), 595-612. DOI ScienceOn |
| 6 | S. Z. Song, Linear operators that preserve column rank of fuzzy matrices, Fuzzy Sets and Systems, 62 (1994), 311-317. DOI ScienceOn |
| 7 | L. B. Beasley and A. E. Guterman, Rank inequalities over semirings, J. Korean Math. Soc. 42(2)(2005), 223-241. 과학기술학회마을 DOI ScienceOn |
| 8 | L. B. Beasley, A. E. Guterman, and C. L. Neal, Linear preservers for Sylvester and Frobenius bounds on matrix rank, Rocky Mountains J. Math. 36(1)(2006), 67-75. DOI |
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