Cyclicity in the Drury-Arveson space and other weighted Besov spaces

Aleman, Alexandru; Perfekt, Karl-Mikael; Richter, Stefan; Sundberg, Carl; Sunkes, James

doi:10.1090/tran/9060

Trans. Amer. Math. Soc.

2023

DOI: 10.1090/tran/9060

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Cyclicity in the Drury-Arveson space and other weighted Besov spaces

Alexandru Aleman,

Karl-Mikael Perfekt,

Stefan Richter

et al.

Abstract: Let H \mathcal {H} be a space of analytic functions on the unit ball B d {\mathbb {B}_d} in C d \mathbb {C}^d with multiplier algebra M u l t ( H ) \mathrm {Mult}(\mathcal {H}) . A function f ∈ H f\in \m… Show more

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2024

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Cited by 2 publications

References 38 publications

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Non‐cyclicity and polynomials in Dirichlet‐type spaces of the unit ball

Vavitsas,

Zarvalis

2024

Bulletin of London Math Soc

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Non‐cyclicity and polynomials in Dirichlet‐type spaces of the unit ball

Vavitsas,

Zarvalis

2024

Bulletin of London Math Soc

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On Pseudo-cyclic Multipliers in Hilbert Function Spaces

Yılmaz

2024

TJMCS

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Let $\mathcal{H}$ be a separable complete Pick space of continuous functions on a compact set $\Omega$ with multiplier algebra $\mathrm{M}(\mathcal{H})$. The notion of the pseudo-cyclicity is recently defined by Aleman et al. In this short paper, we first extend their definition of the pseudo-cyclic multipliers to all functions $f$ in $\mathcal{H}$. Then we show that whenever one-function corona theorem holds for $\mathrm{M}(\mathcal{H})$ then a function $f$ in $\mathcal{H}$ is in the pseudo-cyclic class $ \mathcal{C}_n(\mathcal{H})$ if and only if $1/f$ is in the corresponding Pick-Smirnov type class $N_n^+(\mathcal{H})$. Furthermore, we show that non-vanishing functions $f \in \mathcal{H}$ are in the class $\mathcal{C}_1(\mathcal{H})$. For functions $\varphi, \psi$ in $\mathrm{M}(\mathcal{H})$, with at least one being in $\mathcal{C}_1(\mathcal{H})$, we also show that the invariant subspace generated by $\varphi \psi$ is equal to the intersection of invariant subspaces generated by $\varphi$ and $ \psi$.

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Cyclicity in the Drury-Arveson space and other weighted Besov spaces

Abstract: Let H \mathcal {H} be a space of analytic functions on the unit ball B d {\mathbb {B}_d} in C d \mathbb {C}^d with multiplier algebra M u l t ( H ) \mathrm {Mult}(\mathcal {H}) . A function f ∈ H f\in \m… Show more

Cited by 2 publications

References 38 publications

Non‐cyclicity and polynomials in Dirichlet‐type spaces of the unit ball

Non‐cyclicity and polynomials in Dirichlet‐type spaces of the unit ball

On Pseudo-cyclic Multipliers in Hilbert Function Spaces

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