scientific article; zbMATH DE number 2227320
From MaRDI portal
Publication:5705646
zbMath1114.47027MaRDI QIDQ5705646
Il Bong Jung, Alan L. Lambert, Charles Burnap
Publication date: 9 November 2005
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Related Items (26)
Subspace-hypercyclicity of conditional weighted translations on locally compact groups ⋮ Composition operators with weak hyponormality ⋮ Hypercyclicity of weighted composition operators on \(L^p\)-spaces ⋮ Weighted composition and block shift matrix operators on ℓ^2(ℕ) space ⋮ (n,k)-quasi class Q and (n,k)-quasi class Q^✻ weighted composition operators ⋮ Rank-one perturbation of weighted shifts on a directed tree: partial normality and weak hyponormality ⋮ Seminormal composition operators on \(L^2\) spaces induced by matrices: the Laplace density case ⋮ Aluthge transforms of unbounded weighted composition operators in L2‐spaces ⋮ A note on unbounded hyponormal composition operators in \(L^2\)-spaces ⋮ Gaps of operators via rank-one perturbations ⋮ Weighted shifts on directed trees with one branching vertex: between quasinormality and paranormality ⋮ Unnamed Item ⋮ Unnamed Item ⋮ Some weak p-hyponormal classes of weighted composition operators ⋮ Partially normal composition operators relevant to weighted directed trees ⋮ On unbounded composition operators in \(L^2\)-spaces ⋮ A multiplicative property characterizes quasinormal composition operators in \(L^2\)-spaces ⋮ Separating classes of composition operators via subnormal condition ⋮ Absolute-\((k, m)\)-paranormal and absolute-\((k^*,m)\)-paranormal weighted composition operators ⋮ Unbounded subnormal composition operators in \(L^2\)-spaces ⋮ A Shimorin-type analytic model on an annulus for left-invertible operators and applications ⋮ Class p-wA(s,t) composition operators ⋮ Unnamed Item ⋮ On weighted adjacency operators associated to directed graphs ⋮ Centered operators via Moore-Penrose inverse and Aluthge transformations ⋮ Weighted shifts on directed trees
This page was built for publication:
