When A E ∈LR(H) and B E ∈LR(K) are given, for C E∈LR(K, H) we denoteby Mc the linear relation acting on the infinite dimensional separable Hilbert space H Kof the formIn this paper, we give the necessary and ...When A E ∈LR(H) and B E ∈LR(K) are given, for C E∈LR(K, H) we denoteby Mc the linear relation acting on the infinite dimensional separable Hilbert space H Kof the formIn this paper, we give the necessary and sufficient conditionson A and B for wh{ch Mc is upper semi-Fredholm with negative index or Weyl for some C C ∈LR(K, H).展开更多
The study of operators satisfying σja(T ) = σa(T ) is of significant interest. Does σja(T ) = σa(T ) for n-perinormal operator T ∈ B(H)? This question was raised by Mecheri and Braha [Oper. Matrices 6 ...The study of operators satisfying σja(T ) = σa(T ) is of significant interest. Does σja(T ) = σa(T ) for n-perinormal operator T ∈ B(H)? This question was raised by Mecheri and Braha [Oper. Matrices 6 (2012), 725-734]. In the note we construct a counterexample to this question and obtain the following result: if T is a n-perinormal operator in B(H), then σja(T )/{0} = σa(T )/{0}. We also consider tensor product of n-perinormal operators.展开更多
文摘When A E ∈LR(H) and B E ∈LR(K) are given, for C E∈LR(K, H) we denoteby Mc the linear relation acting on the infinite dimensional separable Hilbert space H Kof the formIn this paper, we give the necessary and sufficient conditionson A and B for wh{ch Mc is upper semi-Fredholm with negative index or Weyl for some C C ∈LR(K, H).
基金supported by NNSF(1122618511201126)the Basic Science and Technological Frontier Project of Henan Province(132300410261)
文摘The study of operators satisfying σja(T ) = σa(T ) is of significant interest. Does σja(T ) = σa(T ) for n-perinormal operator T ∈ B(H)? This question was raised by Mecheri and Braha [Oper. Matrices 6 (2012), 725-734]. In the note we construct a counterexample to this question and obtain the following result: if T is a n-perinormal operator in B(H), then σja(T )/{0} = σa(T )/{0}. We also consider tensor product of n-perinormal operators.
