Add to ORKGAbstract. Our work addresses the question: for which (infinite) Blaschke products B does the star-shift invariant subspace KB: = H2(D) ª BH2(D) contain a (non-trivial) function with a non-trivial singular inner factor? In the case that the zeros of B have only finitely many accumulation points w1, w2,..., wn in T, a recent paper shows that, for an affirmative answer, there necessarily exist k, 1 ≤ k ≤ n, and a subsequence of the zeros of B that converges tangentially to wk on “both sides ” of wk. One of the results in this article improves upon this theorem. And, currently, the only examples of Blaschke products in the literature that are shown to yield an affirmative answer are those that have a proper factor b that satisfies b(D) 6 = D. W...
For a shift operator T with finite multiplicity acting on a separable infinite dimensional Hilbert s...
A classical theorem of Frostman says that if B is a Blaschke product (or any inner function), then i...
Abstract: For a Nevanlinna–Pick problem with more than one solution, Rolf Nevan-linna proved that al...
The context of much of the work in this paper is that of a backward-shift invariant subspace of the ...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
We discuss the boundary behavior of functions in backward shift invariant subspaces $(B H^2)^{\perp}...
AbstractUsing Bourgain's factorization theorem, we characterize the subspaces of Hp, 1⩽p⩽∞, that coi...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
Beurling's theorem characterizes subspaces of the Hardy space invariant under the forward-shift oper...
AbstractLetθbe an inner function and letΛbe a Blaschke sequence in the unit disc. Denote byBthe Blas...
We discuss the boundary behavior of functions in star invariant subspaces (BH2)1, where B is a Blasc...
AbstractLet H2(D2) be the Hardy space over the bidisk. For sequences of Blaschke products {φn(z):−∞<...
AbstractUsing Bourgain's factorization theorem, we characterize the subspaces of Hp, 1⩽p⩽∞, that coi...
For a shift operator T with finite multiplicity acting on a separable infinite dimensional Hilbert s...
A classical theorem of Frostman says that if B is a Blaschke product (or any inner function), then i...
Abstract: For a Nevanlinna–Pick problem with more than one solution, Rolf Nevan-linna proved that al...
The context of much of the work in this paper is that of a backward-shift invariant subspace of the ...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
We discuss the boundary behavior of functions in backward shift invariant subspaces $(B H^2)^{\perp}...
AbstractUsing Bourgain's factorization theorem, we characterize the subspaces of Hp, 1⩽p⩽∞, that coi...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
Beurling's theorem characterizes subspaces of the Hardy space invariant under the forward-shift oper...
AbstractLetθbe an inner function and letΛbe a Blaschke sequence in the unit disc. Denote byBthe Blas...
We discuss the boundary behavior of functions in star invariant subspaces (BH2)1, where B is a Blasc...
AbstractLet H2(D2) be the Hardy space over the bidisk. For sequences of Blaschke products {φn(z):−∞<...
AbstractUsing Bourgain's factorization theorem, we characterize the subspaces of Hp, 1⩽p⩽∞, that coi...
For a shift operator T with finite multiplicity acting on a separable infinite dimensional Hilbert s...
A classical theorem of Frostman says that if B is a Blaschke product (or any inner function), then i...
Abstract: For a Nevanlinna–Pick problem with more than one solution, Rolf Nevan-linna proved that al...