Heat and Poisson semigroups for Fourier-Neumann expansions
- Betancor, J.J. 1
- Ciaurri, O. 4
- Martinez, T. 2
- Perez, M. 3
- Torrea, J.L. 2
- Varona, J.L. 4
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1
Universidad de La Laguna
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2
Universidad Autónoma de Madrid
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3
Universidad de Zaragoza
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4
Universidad de La Rioja
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ISSN: 0037-1912
Ano de publicación: 2006
Volume: 73
Número: 1
Páxinas: 129-142
Tipo: Artigo
beta Ver similares en nube de resultadosOutras publicacións en: Semigroup Forum
Resumo
Given α > -1, consider the second order differential operator in (0, ∞) Lα ≡ (x2d2/dx 2 + (2α + 3)xd/dx + x2 + (α + 1) 2)(f), which appears in the theory of Bessel functions. The purpose of this paper is to develop the corresponding harmonic analysis taking L α as the analogue to the classical Laplacian. Namely we study the boundedness properties of the heat and Poisson semigroups. These boundedness properties allow us to obtain some convergence results that can be used to solve the Cauchy problem for the corresponding heat and Poisson equations. © Springer 2006.