[1] |
WEYL H V. ber beschrnkte quadratische Formen, deren differenz vollstetig ist[J]. Rendiconti Del Circolo Matematico Di Palermo, 1909, 27(1): 373-392.
|
[2] |
BERBERIAN S K. An extension of Weyl’s theorem to a class of not necessarily normal operators[J]. Michigan Mathematical Journal, 1969, 16(3): 273-279.
|
[3] |
LI C, ZHU S, FENG Y, et al. Weyl’s theorem for functions of operators and approximation[J]. Integral Equations and Operator Theory, 2010, 67(4): 481-497.
|
[4] |
CURTO R E, HAN Y M. Weyl’s theorem for algebraically paranormal operators[J]. Integral Equations and Operator Theory, 2003, 47(3):307-314.
|
[5] |
AN I, HAN Y. Weyl’s theorem for algebraically quasi-class A operators[J]. Integral Equations and Operator Theory, 2008, 62(1): 1-10.
|
[6] |
SHI W, CAO X. Weyl’s theorem for the square of operator and perturbations[J]. Communications in Contemporary Mathematics, 2015, 17(5): 36-46 .
|
[7] |
COBURN L A. Weyl’s theorem for nonnormal operators[J]. Michigan Mathematical Journal, 1966, 13(3): 285-288.
|
[8] |
DUGGAL B P. The Weyl spectrum of p-hyponormal operators[J]. Integral Equations and Operator Theory, 1997, 29(2): 197-201.
|
[9] |
CAO X. Analytically class operators and Weyl’s theorem[J]. Journal of Mathematical Analysis and Applications, 2006, 320(2): 795-803.
|
[10] |
HARTE R, LEE W Y. Another note on Weyl’s theorem[J]. Trans Amer Math Soc, 1997, 349(5): 2115-2124.
|
[11] |
HERRERO D A. Limits of hypercyclic and supercyclic operators[J]. Journal of Functional Analysis, 1991, 99(1): 179-190.
|
[12] |
CAO X, GUO M, MENG B, et al. Weyl’s spectra and Weyl’s theorem[J]. Journal of Mathematical Analysis and Applications, 2003, 288(2): 758-767.)
|
[1] |
WEYL H V. ber beschrnkte quadratische Formen, deren differenz vollstetig ist[J]. Rendiconti Del Circolo Matematico Di Palermo, 1909, 27(1): 373-392.
|
[2] |
BERBERIAN S K. An extension of Weyl’s theorem to a class of not necessarily normal operators[J]. Michigan Mathematical Journal, 1969, 16(3): 273-279.
|
[3] |
LI C, ZHU S, FENG Y, et al. Weyl’s theorem for functions of operators and approximation[J]. Integral Equations and Operator Theory, 2010, 67(4): 481-497.
|
[4] |
CURTO R E, HAN Y M. Weyl’s theorem for algebraically paranormal operators[J]. Integral Equations and Operator Theory, 2003, 47(3):307-314.
|
[5] |
AN I, HAN Y. Weyl’s theorem for algebraically quasi-class A operators[J]. Integral Equations and Operator Theory, 2008, 62(1): 1-10.
|
[6] |
SHI W, CAO X. Weyl’s theorem for the square of operator and perturbations[J]. Communications in Contemporary Mathematics, 2015, 17(5): 36-46 .
|
[7] |
COBURN L A. Weyl’s theorem for nonnormal operators[J]. Michigan Mathematical Journal, 1966, 13(3): 285-288.
|
[8] |
DUGGAL B P. The Weyl spectrum of p-hyponormal operators[J]. Integral Equations and Operator Theory, 1997, 29(2): 197-201.
|
[9] |
CAO X. Analytically class operators and Weyl’s theorem[J]. Journal of Mathematical Analysis and Applications, 2006, 320(2): 795-803.
|
[10] |
HARTE R, LEE W Y. Another note on Weyl’s theorem[J]. Trans Amer Math Soc, 1997, 349(5): 2115-2124.
|
[11] |
HERRERO D A. Limits of hypercyclic and supercyclic operators[J]. Journal of Functional Analysis, 1991, 99(1): 179-190.
|
[12] |
CAO X, GUO M, MENG B, et al. Weyl’s spectra and Weyl’s theorem[J]. Journal of Mathematical Analysis and Applications, 2003, 288(2): 758-767.)
|