An operator on a separable Hilbert space with many hypercyclic vectors

Bernard Beauzamy

Displaying similar documents to “An operator on a separable Hilbert space with many hypercyclic vectors”

An operator on a separable Hilbert space with all polynomials hypercyclic

Bernard Beauzamy (1990)

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Kurt Mahler (1972)

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On some results involving generalized hypergeometric polynomials

Dahiya, R.S., Singh, Bhagat (1974)

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On the volume of unit balls in Banach spaces

Carsten Schütt (1982)

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The Littlewood-Paley function and φ-trans-form characterizations of a new Hardy space HK₂ associated with the Herz space

Shanzhen Lu, Dachun Yang (1992)

Studia Mathematica

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We give a Littlewood-Paley function characterization of a new Hardy space HK₂ and its φ-transform characterizations in M. Frazier & B. Jawerth's sense.

Partial Quasi-Bilateral Generating Function Involving some Special Functions

Sarkar, Asit (2002)

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A group-theoretic method of obtaining more general class of generating functions from a given class of partial quasi-bilateral generating functions involving Hermite, Laguerre and Gegenbaur polynomials are discussed.

Orthogonal polynomials and middle Hankel operators on Bergman spaces

Lizhong Peng, Richard Rochberg, Zhijian Wu (1992)

Studia Mathematica

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We introduce a sequence of Hankel style operators $H^{k}$ , k = 1,2,3,..., which act on the Bergman space of the unit disk. These operators are intermediate between the classical big and small Hankel operators. We study the boundedness and Schatten-von Neumann properties of the $H^{k}$ and show, among other things, that $H^{k}$ are cut-off at 1/k. Recall that the big Hankel operator is cut-off at 1 and the small Hankel operator at 0.

On the estimation of Cesàro means of orthonormal series

J. Meder (1958)

Annales Polonici Mathematici

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