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Currently displaying 1 – 13 of 13

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Transplanting Maximal Inequalities Between Laguerre and Hankel Multipliers.

Krzysztof Stempak — 1996

Monatshefte für Mathematik

On convolution products of radial measures on the Heisenberg group

Krzysztof Stempak — 1985

Colloquium Mathematicae

Equiconvergence for Laguerre function series

Krzysztof Stempak — 1996

Studia Mathematica

We prove an equiconvergence theorem for Laguerre expansions with partial sums related to partial sums of the (non-modified) Hankel transform. Combined with an equiconvergence theorem recently proved by Colzani, Crespi, Travaglini and Vignati this gives, via the Carleson-Hunt theorem, a.e. convergence results for partial sums of Laguerre function expansions.

Almost everywhere summability of Laguerre series

Krzysztof Stempak — 1991

Studia Mathematica

We apply a construction of generalized twisted convolution to investigate almost everywhere summability of expansions with respect to the orthonormal system of functions $ℓ_{n}^{a} (x) = {(n! / Γ (n + a + 1))}^{1 / 2} e^{- x / 2} L_{n}^{a} (x)$ , n = 0,1,2,..., in $L^{2} (ℝ_{+}, x^{a} d x)$ , a ≥ 0. We prove that the Cesàro means of order δ > a + 2/3 of any function $f \in L^{p} (x^{a} d x)$ , 1 ≤ p ≤ ∞, converge to f a.e. The main tool we use is a Hardy-Littlewood type maximal operator associated with a generalized Euclidean convolution.

An algebra associated with the generalized sublaplacian

Krzysztof Stempak — 1988

Studia Mathematica

A weighted multiplier theorem for Rockland operators

Krzysztof Stempak — 1987

Colloquium Mathematicae

A note on Zemanian spaces.

Krzysztof Stempak — 1997

Extracta Mathematicae

On weighted transplantation and multipliers for Laguerre expansions.

Walter Trebels; Krzysztof Stempak — 1994

Mathematische Annalen

Hankel multipliers and transplantation operators

Krzysztof Stempak; Walter Trebels — 1997

Studia Mathematica

Connections between Hankel transforms of different order for $L^{p}$ -functions are examined. Well known are the results of Guy [Guy] and Schindler [Sch]. Further relations result from projection formulae for Bessel functions of different order. Consequences for Hankel multipliers are exhibited and implications for radial Fourier multipliers on Euclidean spaces of different dimensions indicated.

Conjugacy for Fourier-Bessel expansions

Óscar Ciaurri; Krzysztof Stempak — 2006

Studia Mathematica

We define and investigate the conjugate operator for Fourier-Bessel expansions. Weighted norm and weak type (1,1) inequalities are proved for this operator by using a local version of the Calderón-Zygmund theory, with weights in most cases more general than $A_{p}$ weights. Also results on Poisson and conjugate Poisson integrals are furnished for the expansions considered. Finally, an alternative conjugate operator is discussed.

Riesz transforms for the Dunkl Ornstein-Uhlenbeck operator

Adam Nowak; Luz Roncal; Krzysztof Stempak — 2010

Colloquium Mathematicae

We propose a definition of Riesz transforms associated to the Ornstein-Uhlenbeck operator based on the Dunkl Laplacian. In the case related to the group ℤ ₂ it is proved that the Riesz transform is bounded on the corresponding $L^{p}$ spaces, 1 < p < ∞.