Hardy's inequality for fractional powers of the sublaplacian on the Heisenberg group
- Roncal, L. 1
- Thangavelu, S. 2
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1
Universidad de La Rioja
info
- 2 Department of Mathematics, Indian Institute of Science, Bangalore, India
ISSN: 0001-8708
Año de publicación: 2016
Volumen: 302
Páginas: 106-158
Tipo: Artículo
Otras publicaciones en: Advances in Mathematics
Resumen
We prove Hardy inequalities for the conformally invariant fractional powers of the sublaplacian on the Heisenberg group Hn. We prove two versions of such inequalities depending on whether the weights involved are non-homogeneous or homogeneous. In the first case, the constant arising in the Hardy inequality turns out to be optimal. In order to get our results, we will use ground state representations. The key ingredients to obtain the latter are some explicit integral representations for the fractional powers of the sublaplacian and a generalized result by M. Cowling and U. Haagerup. The approach to prove the integral representations is via the language of semigroups. As a consequence of the Hardy inequalities we also obtain versions of Heisenberg uncertainty inequality for the fractional sublaplacian. © 2016 Elsevier Inc.