Let G be a simple Lie group of real rank one, with Iwasawa decomposition KAN and Bruhat big cell NMAN. Then the space G/MAN may be (almost) identified with N and with K/M; and these identifications induce the (generalised) Cayley transform C from N into K/M. We show that C is a conformal map of Carnot–Caratheodory manifolds, and that composition with the Cayley transform, combined with multiplication by appropriate powers of the Jacobian, induces isomorphisms of Sobolev spaces on N and K/M. We use this to construct bounded and slowly growing representations of G.
Astengo, F., Cowling, M., DI BLASIO, B. (2004). The Cayley transform and uniformly bounded representations. JOURNAL OF FUNCTIONAL ANALYSIS, 213(2), 241-269 [10.1016/j.jfa.2003.12.009].
The Cayley transform and uniformly bounded representations
DI BLASIO, BIANCA
2004
Abstract
Let G be a simple Lie group of real rank one, with Iwasawa decomposition KAN and Bruhat big cell NMAN. Then the space G/MAN may be (almost) identified with N and with K/M; and these identifications induce the (generalised) Cayley transform C from N into K/M. We show that C is a conformal map of Carnot–Caratheodory manifolds, and that composition with the Cayley transform, combined with multiplication by appropriate powers of the Jacobian, induces isomorphisms of Sobolev spaces on N and K/M. We use this to construct bounded and slowly growing representations of G.
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