On 
-quasi class 
Operators
Abstract
Let 
be a bounded linear operator on a complex Hilbert space 
. In this paper we introduce a new class of operators: -quasi class operators, superclass of -quasi paranormal operators. An operator is said to be -quasi class if it satisfies 
and for some nonnegative integers 
and 
. We prove the basic structural properties of this class of operators. It will be proved that If has a no non-trivial invariant subspace, then the nonnegative operator -quasi class does not have SVEP property. In the last section we also characterize the -quasi class composition operators on Fock spaces.
be a bounded linear operator on a complex Hilbert space . In this paper we introduce a new class of operators: -quasi class operators, superclass of -quasi paranormal operators. An operator is said to be -quasi class if it satisfies for all
and for some nonnegative integers and . We prove the basic structural properties of this class of operators. It will be proved that If has a no non-trivial invariant subspace, then the nonnegative operator is a strongly stable contraction. In section 4, we give some examples which compare our class with other known classes of operators and as a consequence we prove that
-quasi class does not have SVEP property. In the last section we also characterize the -quasi class composition operators on Fock spaces.DOI Code:
10.1285/i15900932v39n2p39
Keywords:
$(n,k)$-quasi class $Q$; $(n,k)$-quasi paranormal operators; SVEP property; Fock space; composition operators
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