Abstract
We study the set of k-quasi-(m, n,C)-isosymmetric operators. This family extends the
set of (m, , n,C)-isosymmetric operators. In the present article, we give operator matrix
representation of k-quasi-(m, , n,C)-isosymmetric operator in order to obtain some structural
properties for such operators. we show that if R is k-quasi-(m, n,C)-isosymmetric,
then Rq is a k-quasi-(m, n,C)-isosymmetric operator. We show that the product of an
k1-quasi-(m1, n1,C)-isosymmetric and an n2-quasi-(m2, n2,C)-isosymmetric which are Cdouble
commuting is an max{k1, k2}-quasi-(m1 + m2 − 1, n1 + n2 − 1,C)-isosymmetry
under suitable conditions. In particular, we prove the stability of perturbation of kquasi-(
m, n,C)-isosymmetric operator by a nilpotent operator of order p under suitable
conditions. Moreover, we give some results about the joint approximate spectrum of a
k-quasi-(m, n,C)-isosymmetric operators.
Supporting Institution
the Deanship of Scientific Research at Jouf University
Project Number
(DSR-2021-03-0337)
References
- [1] A. Abeer, O.A. Mahmoud Sid Ahmed and B.A. Farsin, n-quasi-m-complex symmetric operators, Symmetry 15 (9), 1662, 2023.
Abstract
Project Number
(DSR-2021-03-0337)
References
- [1] A. Abeer, O.A. Mahmoud Sid Ahmed and B.A. Farsin, n-quasi-m-complex symmetric operators, Symmetry 15 (9), 1662, 2023.
Details
| Primary Language | English |
|---|---|
| Subjects | Operator Algebras and Functional Analysis |
| Journal Section | Mathematics |
| Authors | |
| Project Number | (DSR-2021-03-0337) |
| Early Pub Date | April 14, 2024 |
| Publication Date | |
| Published in Issue | Year 2024 Early Access |