Limit points for descent spectrum of operator matrices

Boua, H.; Karmouni, M.; Tajmouati, A.

doi:10.2478/mjpaa-2022-0024

Abstract

In this paper, we investigate the limit points set of descent spectrum of upper triangular operator matrices $M_{C} = (\begin{array}{l} A & C \\ 0 & B \end{array})$ {M_C} = \left( {\matrix{A \hfill & C \hfill \cr 0 \hfill & B \hfill \cr } } \right) . We prove that acc(σ_des(M_C)) ∪ W_{accσ_des} = acc(σ_des(A)) ∪ acc(σ_des(B)) where W_accσdes is the union of certain holes in acc(σ_des(M_C)), which happen to be subsets of acc(σ_asc(B)) ∩ acc(σ_des(A)). Furthermore, several sufficient conditions for acc(σ_des(M_C)) = acc(σ_des(A)) ∪ acc(σ_des(B)) holds for every C ∈ ℬ(Y, X) are given.

References

[1] M. Burgos, A. Kaidi, M. Mbekhta, and M. Oudghiri The descent spectrum and perturbations, J. Operator Theory 56:2(2006), 259-271.
Search in Google Scholar Back to article
[2] H. Elbjaoui and E. H. Zerouali. Local spectral theory for 2 × 2 operator matrices, IJMMS (2003):42, 2667-2672.10.1155/S0161171203012043
Search in Google Scholar Back to article
[3] K.B.Laursen and P. Vrbová Some remarks on the surjectivy spectrum of linear operators, Czech. Math. J. 39 (1989), 730-739.10.21136/CMJ.1989.102350
Search in Google Scholar Back to article
[4] Koliha JJ. A Generalized Drazin inverse, Glasgow Math. J. 1996, 38:367-81.10.1017/S0017089500031803
Search in Google Scholar Back to article
[5] A. Tajmouati, M. Karmouni and S. Alaoui Chrifi Limit points for Browder spectrum of operator matrices. Rend. Circ. Mat. Palermo, II. Ser. DOI 10.1007/s12215-019-00410-7.
Search in Google Scholar Back to article
[6] A.E. TAYLOR, D.C. LAY Introduction to Functional Analysis, Wiley, New York-Chichester-Brisbane 1980.
Search in Google Scholar Back to article
[7] H. Zariouh and H. Zguitti. On Pseudo B-Weyl operators and generalized Drazin invertible for operator matrices, Linear and Multilinear Algebra, Volume 64, issue 7, (2016), 1245-1257.10.1080/03081087.2015.1082959
Search in Google Scholar Back to article
[8] E. H. Zerouali and H. Zguitti. Perturbation of spectra of operator matrices and local spectral theory, J Math Anal Appl, 2006, 324: 992-1005.10.1016/j.jmaa.2005.12.065
Search in Google Scholar Back to article
[9] S. Zhang, H. Zhong and L. Lin. Generalized Drazin spectrum of operator matrices, Appl. Math. J. Chinese Univ. 29 (2) (2014), 162-170.10.1007/s11766-014-3142-1
Search in Google Scholar Back to article
[10] S. F. Zhang, H. J. Zhang and J. D. Wu. Spectra of upper triangular operator matrices, Acta Math Sinica (in Chinese), 2011, 54: 41-60.
Search in Google Scholar Back to article

Limit points for descent spectrum of operator matrices

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