George Benke scite author profile

Let B denote the unit ball in ℂn, and dV(z) normalized Lebesgue measure on B. For α > -1, define dVα(z) = (1 - \z\2)αdV(z). Let (B) denote the space of holomorhic functions on B, and for 0 < p < ∞, let p(dVα) denote Lp(dVα) ∩ (B). In this note we characterize p(dVα) as those functions in (B) whose images under the action of a certain set of differential operators lie in Lp(dVα). This is valid for 1 < p < oo. We also show that the Cesàro operator is bounded on p(dVα) for 0 < p < oo. Analogous results are given for the polydisc.

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Generalized Rudin-Shapiro Systems

Benke

1994

J Fourier Anal Appl

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The classical Rudin-Shapiro construction produces a sequence of polynomials with ±1 coefficients such that on the unit circle each such polynomial P satisfies the "flatness" property P ∞ ≤ √ 2 P 2 . It is shown how to construct blocks of such flat polynomials so that the polynomials in each block form an orthogonal system. The construction depends on a fundamental generating matrix and a recursion rule. When the generating matrix is a multiple of a unitary matrix, the flatness, orthogonality, and other symmetries are obtained. Two different recursion rules are examined in detail and are shown to generate the same blocks of polynomials although with permuted orders. When the generating matrix is the Fourier matrix, closed-form formulas for the polynomial coefficients are obtained. The connection with the Hadamard matrix is also discussed.

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On the hypergroup structure of central Λ(p) sets

Benke¹

1974

Pacific J. Math.

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Bernstein's theorem for compact groups

Benke

1980

Journal of Functional Analysis

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George Benke

Brain chirps: spectrographic signatures of epileptic seizures

A note on weighted Bergman spaces and the Cesaro Operator

Generalized Rudin-Shapiro Systems

On the hypergroup structure of central Λ(p) sets

Bernstein's theorem for compact groups

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