Sundaram Thangavelu (1991)
Revista Matemática Iberoamericana
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The aim of this paper is to study mean value operators on the reduced Heisenberg group H/Γ, where H is the Heisenberg group and Γ is the subgroup {(0,2πk): k ∈ Z} of H.
Piotr Graczyk, Jean-Jacques Lœb (1994)
Bulletin de la Société Mathématique de France
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Martin J. Mohlenkamp (1999)
The journal of Fourier analysis and applications [[Elektronische Ressource]]
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John Hymers
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Per Sjölin, Fernando Soria (1999)
Publicacions Matemàtiques
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In this paper we establish a formal connection between the average decay of the Fourier transform of functions with respect to a given measure and the of that measure. We also present a generalization of the classical restriction theorem of Stein and Tomas replacing the sphere with sets of prefixed Hausdorff dimension n - 1 + α, with 0 < α < 1.
Francesca Astengo, Bianca Di Blasio, Fulvio Ricci (2013)
Studia Mathematica
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Let H₁ be the 3-dimensional Heisenberg group. We prove that a modified version of the spherical transform is an isomorphism between the space 𝓢ₘ(H₁) of Schwartz functions of type m and the space 𝓢(Σₘ) consisting of restrictions of Schwartz functions on ℝ² to a subset Σₘ of the Heisenberg fan with |m| of the half-lines removed. This result is then applied to study the case of general Schwartz functions on H₁.
Mark L. Agranovsky, Rama Rawat (1999)
The journal of Fourier analysis and applications [[Elektronische Ressource]]
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Avelino, Catarina P., Breda, A.M.d&#039;Azevedo, Santos, Altino F. (2010)
Beiträge zur Algebra und Geometrie
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Bezubik, Agata, Strasburger, Aleksander (2006)
SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]
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T. Godoy, L. Saal (2006)
Colloquium Mathematicae
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Let 𝓢(Hₙ) be the space of Schwartz functions on the Heisenberg group Hₙ. We define a spherical transform on 𝓢(Hₙ) associated to the action (by automorphisms) of U(p,q) on Hₙ, p + q = n. We determine its kernel and image and obtain an inversion formula analogous to the Godement-Plancherel formula.
Akos Magyar (1997)
Revista Matemática Iberoamericana
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We prove analogue statements of the spherical maximal theorem of E. M. Stein, for the lattice points Z. We decompose the discrete spherical measures as an integral of Gaussian kernels s(x) = e. By using Minkowski's integral inequality it is enough to prove L-bounds for the corresponding convolution operators. The proof is then based on L-estimates by analysing the Fourier transforms ^s(ξ), which can be handled by making use of the circle method for exponential sums. As a corollary one...
Jacques Faraut (2010)
Colloquium Mathematicae
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The asymptotics of spherical functions for large dimensions are related to spherical functions for Olshanski spherical pairs. In this paper we consider inductive limits of Gelfand pairs associated to the Heisenberg group. The group K = U(n) × U(p) acts multiplicity free on 𝓟(V), the space of polynomials on V = M(n,p;ℂ), the space of n × p complex matrices. The group K acts also on the Heisenberg group H = V × ℝ. By a result of Carcano, the pair (G,K) with G = K ⋉ H is a Gelfand pair....
L. Brandolini, A. Iosevich (2001)
The journal of Fourier analysis and applications [[Elektronische Ressource]]
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