In this paper the exponential type of hypercyclic entire functions with respect to a sequence (Φn(D)) of differential operators is considered, where every Φn is an entire function of exponential type. We prove that under suitable conditions certain rates of growth are possible for hypercyclicity while others are not. In particular, our statements extend the negative part of a sharp result on growth of D-hypercyclic entire functions due to Grosse-Erdmann, and are related to a result by Chan and Shapiro about the existence of Φ(D)-hypercyclic functions in certain Hilbert spaces of entire functions.Dirección General de Enseñanza Superior (DGES). EspañaJunta de Andalucí
Infinite-order differential operators appear in different fields of mathematics and physics and in t...
AbstractIn this paper, we provide some extensions of earlier results about hypercyclicity of some op...
Let A be an unbounded Arakelian set in the complex plane whose complement has infinite inscribed rad...
In this paper, an eigenvalue criterion for hypercyclicity due to the first author is improved. As a ...
In this paper, we provide some extensions of earlier results about hypercyclicity of some operators ...
AbstractIn this paper, we provide some extensions of earlier results about hypercyclicity of some op...
AbstractLet be a weighted shift operator on the space of entire functions. Suppose that |aa| → ∞ mo...
We show that exponential growth is the critical discrete rate of growth for zero-free entire functio...
It is shown in this short note the existence, for each nonzero member of the ideal of D-multiples of...
We prove that, given a sequence of points in a complex domain Ω without accumulation points, there a...
We study the existence of hypercyclic algebras for convolution operators Φ(D) on the space of entire...
AbstractA sequence T=(Tn) of continuous linear operators Tn:X→X is said to be hypercyclic if there e...
For the Dunkl operator Λα (α > −1/2) on the space of entire functions on the complex space C, the c...
[EN] We provide an alternative proof to those by Shkarin and by Bayart and Matheron that the operato...
We study the rate of growth of entire functions that are distributionally irregular for the differe...
Infinite-order differential operators appear in different fields of mathematics and physics and in t...
AbstractIn this paper, we provide some extensions of earlier results about hypercyclicity of some op...
Let A be an unbounded Arakelian set in the complex plane whose complement has infinite inscribed rad...
In this paper, an eigenvalue criterion for hypercyclicity due to the first author is improved. As a ...
In this paper, we provide some extensions of earlier results about hypercyclicity of some operators ...
AbstractIn this paper, we provide some extensions of earlier results about hypercyclicity of some op...
AbstractLet be a weighted shift operator on the space of entire functions. Suppose that |aa| → ∞ mo...
We show that exponential growth is the critical discrete rate of growth for zero-free entire functio...
It is shown in this short note the existence, for each nonzero member of the ideal of D-multiples of...
We prove that, given a sequence of points in a complex domain Ω without accumulation points, there a...
We study the existence of hypercyclic algebras for convolution operators Φ(D) on the space of entire...
AbstractA sequence T=(Tn) of continuous linear operators Tn:X→X is said to be hypercyclic if there e...
For the Dunkl operator Λα (α > −1/2) on the space of entire functions on the complex space C, the c...
[EN] We provide an alternative proof to those by Shkarin and by Bayart and Matheron that the operato...
We study the rate of growth of entire functions that are distributionally irregular for the differe...
Infinite-order differential operators appear in different fields of mathematics and physics and in t...
AbstractIn this paper, we provide some extensions of earlier results about hypercyclicity of some op...
Let A be an unbounded Arakelian set in the complex plane whose complement has infinite inscribed rad...
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