AbstractGiven a discrete set Λ⊂C\R, let RΛp denote the subspace of Lp(R) generated by rational functions with poles in Λ. We determine for which Λ's the differentiation operator d/dx:RΛp→Lp(R) is bounded or compact
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
The context of much of the work in this paper is that of a backward-shift invariant subspace of the ...
AbstractGiven a discrete set Λ⊂C\R, let RΛp denote the subspace of Lp(R) generated by rational funct...
We prove that a proper differentiation invariant subspace of C\infty such that the restriction of th...
Let L be a proper differentiation invariant subspace of C-infinity (a, b) such that the restriction ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
AbstractLet μ be a positive measure of compact support in the complex plane. Let P be the set of com...
ABSTRACT. Let X be a compact subset of the complex plane. We denote by Ro(X) the algebra consisting ...
ABSTRACT. Let X be a compact subset of the complex plane. We denote by Ro(X) the algebra consisting ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
Abstract. If B is a compact space and B \ {pt} is Lindelöf then Bκ \ {−→pt} is star-Linedlöf for e...
D = { Izl < 1). That is, •b is in the Hardy class H øø of analytic functions bounded on D and li...
AbstractWe construct continuous linear operators without non-trivial invariant subspaces on several ...
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
The context of much of the work in this paper is that of a backward-shift invariant subspace of the ...
AbstractGiven a discrete set Λ⊂C\R, let RΛp denote the subspace of Lp(R) generated by rational funct...
We prove that a proper differentiation invariant subspace of C\infty such that the restriction of th...
Let L be a proper differentiation invariant subspace of C-infinity (a, b) such that the restriction ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
AbstractLet μ be a positive measure of compact support in the complex plane. Let P be the set of com...
ABSTRACT. Let X be a compact subset of the complex plane. We denote by Ro(X) the algebra consisting ...
ABSTRACT. Let X be a compact subset of the complex plane. We denote by Ro(X) the algebra consisting ...
ABSTRACT. We discuss the boundary behavior of functions in star invariant subspaces (BH2)⊥, where B ...
AbstractThe context of much of the work in this paper is that of a backward-shift invariant subspace...
Abstract. If B is a compact space and B \ {pt} is Lindelöf then Bκ \ {−→pt} is star-Linedlöf for e...
D = { Izl < 1). That is, •b is in the Hardy class H øø of analytic functions bounded on D and li...
AbstractWe construct continuous linear operators without non-trivial invariant subspaces on several ...
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
ABSTRACT. Let E be a compact subset of the complex plane C. We denote by R(E) the algebra consisting...
The context of much of the work in this paper is that of a backward-shift invariant subspace of the ...
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