6533b7d2fe1ef96bd125e289

RESEARCH PRODUCT

Algebras of frequently hypercyclic vectors

Karl-g. Grosse-erdmannJavier Falcó

subject

Mathematics::Functional AnalysisPure mathematicsGeneral MathematicsEntire function010102 general mathematicsBanach spaceDynamical Systems (math.DS)Shift operatorSpace (mathematics)01 natural sciences010101 applied mathematicsStatistics::Machine LearningOperator (computer programming)Product (mathematics)Banach algebraFOS: MathematicsHadamard productMathematics - Dynamical Systems0101 mathematics47A16Mathematics

description

We show that the multiples of the backward shift operator on the spaces $\ell_{p}$, $1\leq p<\infty$, or $c_{0}$, when endowed with coordinatewise multiplication, do not possess frequently hypercyclic algebras. More generally, we characterize the existence of algebras of $\mathcal{A}$-hypercyclic vectors for these operators. We also show that the differentiation operator on the space of entire functions, when endowed with the Hadamard product, does not possess frequently hypercyclic algebras. On the other hand, we show that for any frequently hypercyclic operator $T$ on any Banach space, $FHC(T)$ is algebrable for a suitable product, and in some cases it is even strongly algebrable.

yearjournalcountryeditionlanguage
2019-04-03Mathematische Nachrichten
https://doi.org/10.1002/mana.201900184