Hypercyclictty and Countable Hypercyclicity for Adjoint of Operators
محتوى المقالة الرئيسي
الملخص
Let be an infinite dimensional separable complex Hilbert space and let , where is the Banach algebra of all bounded linear operators on . In this paper we prove the following results.
If is a operator, then
1. is a hypercyclic operator if and only if D and for every hyperinvariant subspace of .
2. If is a pure, then is a countably hypercyclic operator if and only if and for every hyperinvariant subspace of .
3. has a bounded set with dense orbit if and only if for every hyperinvariant subspace of , .
If is a operator, then
1. is a hypercyclic operator if and only if D and for every hyperinvariant subspace of .
2. If is a pure, then is a countably hypercyclic operator if and only if and for every hyperinvariant subspace of .
3. has a bounded set with dense orbit if and only if for every hyperinvariant subspace of , .
تفاصيل المقالة
كيفية الاقتباس
1.
Hypercyclictty and Countable Hypercyclicity for Adjoint of Operators. Baghdad Sci.J [انترنت]. 7 مارس، 2010 [وثق 17 مايو، 2024];7(1):191-9. موجود في: https://bsj.uobaghdad.edu.iq/index.php/BSJ/article/view/2887
القسم
article
كيفية الاقتباس
1.
Hypercyclictty and Countable Hypercyclicity for Adjoint of Operators. Baghdad Sci.J [انترنت]. 7 مارس، 2010 [وثق 17 مايو، 2024];7(1):191-9. موجود في: https://bsj.uobaghdad.edu.iq/index.php/BSJ/article/view/2887
