Composition operators and generalized primes

Athanasios, Kouroupis,

doi:10.1090/proc/16395

Proc. Amer. Math. Soc.

2023

DOI: 10.1090/proc/16395

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Composition operators and generalized primes

Kouroupis, Athanasios

Abstract: We study composition operators on the Hardy space H 2 \mathcal {H}^2 of Dirichlet series with square summable coefficients. Our main result is a necessary condition, in terms of a Nevanlinna-type counting function, for a certain class of composition operators to be compact on H 2 \mathcal {H}^2 . To do that we extend our notions to a Hardy space H Λ … Show more

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Cited by 2 publications

References 26 publications

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A note on Bohr’s theorem for Beurling integer systems

Broucke,

Kouroupis,

Perfekt

2023

Math. Ann.

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Given a sequence of frequencies $$\{\lambda _n\}_{n\ge 1}$$ { λ n } n ≥ 1 , a corresponding generalized Dirichlet series is of the form $$f(s)=\sum _{n\ge 1}a_ne^{-\lambda _ns}$$ f ( s ) = ∑ n ≥ 1 a n e - λ n s . We are interested in multiplicatively generated systems, where each number $$e^{\lambda _n}$$ e λ n arises as a finite product of some given numbers $$\{q_n\}_{n\ge 1}$$ { q n } n ≥ 1 , $$1 < q_n \rightarrow \infty $$ 1 < q n → ∞ , referred to as Beurling primes. In the classical case, where $$\lambda _n = \log n$$ λ n = log n , Bohr’s theorem holds: if f converges somewhere and has an analytic extension which is bounded in a half-plane $$\{\Re s> \theta \}$$ { ℜ s > θ } , then it actually converges uniformly in every half-plane $$\{\Re s> \theta +\varepsilon \}$$ { ℜ s > θ + ε } , $$\varepsilon >0$$ ε > 0 . We prove, under very mild conditions, that given a sequence of Beurling primes, a small perturbation yields another sequence of primes such that the corresponding Beurling integers satisfy Bohr’s condition, and therefore the theorem. Applying our technique in conjunction with a probabilistic method, we find a system of Beurling primes for which both Bohr’s theorem and the Riemann hypothesis are valid. This provides a counterexample to a conjecture of H. Helson concerning outer functions in Hardy spaces of generalized Dirichlet series.

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A note on Bohr’s theorem for Beurling integer systems

Broucke,

Kouroupis,

Perfekt

2023

Math. Ann.

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Generalized Counting Functions and Composition Operators on Weighted Bergman Spaces of Dirichlet Series

He,

Wang,

Chen

2024

Acta Math Sci

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Composition operators and generalized primes

Cited by 2 publications

References 26 publications

A note on Bohr’s theorem for Beurling integer systems

A note on Bohr’s theorem for Beurling integer systems

Generalized Counting Functions and Composition Operators on Weighted Bergman Spaces of Dirichlet Series

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