In this paper we extend the De Giorgi notion of rectifiability of surfaces in non homogeneous Lie groups. This notion and the principal properties of Cacciopoli sets had already been proved in homogeneous Lie group, using a blow-up method, with respect to the natural dilations. In non homogeneous Lie groups no dilations are defined, so that we need to apply a freezing method, locally approximating the non homogeneous structure, with an homogeneous one.
G. Citti, M. Manfredini (2005). Blow-up in non homogeneous Lie groups and rectifiability,. HOUSTON JOURNAL OF MATHEMATICS, 31, 333-353.
Blow-up in non homogeneous Lie groups and rectifiability,
CITTI, GIOVANNA;MANFREDINI, MARIA
2005
Abstract
In this paper we extend the De Giorgi notion of rectifiability of surfaces in non homogeneous Lie groups. This notion and the principal properties of Cacciopoli sets had already been proved in homogeneous Lie group, using a blow-up method, with respect to the natural dilations. In non homogeneous Lie groups no dilations are defined, so that we need to apply a freezing method, locally approximating the non homogeneous structure, with an homogeneous one.File in questo prodotto:
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