SEMINARIO DI SISTEMI DINAMICI OLOMORFI (e dintorni)
Centro di
Ricerca Matematica De
Giorgi
Sala
Conferenze
Lunedi' 19
marzo,
--->
ore 14.30 <---
Carlo Carminati (Pisa)
"Linearization of germs:
regular dependence on the multiplier"
(abstarct in
coda)
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SEMINARIO DI SISTEMI DINAMICI OLOMORFI (e
dintorni)
Centro di Ricerca Matematica De
Giorgi
Sala
Conferenze
Lunedi' 26
marzo,
--->
ore 14.30 <---
Jasmin Raissy (Pisa)
"Linearization of
holomorphic germs with quasi-elliptic fixed
points"
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ABSTRACT.1
- 19 marzo. [joint work with S. Marmi]
We prove that the linearization of
germs of holomorphic (or formal) maps with a fixed point
in one complex
dimension have a ${\cal C}^1$--holomorphic dependence on the multiplier
$\lambda$.
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The linearization is analytic for $\lambda\in{\mathbb
P}^1\C\setminus{\mathbb S}^1$,
the unit circle~$\Su$ appears as a natural
boundary (because of resonances, i.e. roots of unity),
but the solutions are
still defined at points of~${\mathbb S}^1$ which lie ``far enough from
resonances'',
i.e.\ when the multiplier satisfies a suitable arithmetical
condition.
We construct an increasing sequence of compacts which avoid
resonances and prove that the linearization
belongs to the associated space
of ${\cal C}^1$--holomorphic functions. These are a special case of
Borel's
uniform monogenic functions, and their space is arcwise-quasianalytic
\cite{MS2}.
Among the consequences of these results, we can prove that
the
linearizations are defined and admit asymptotic expansions of Gevrey type at the
points of~${\mathbb S}^1$
which satisfy a uniform version of the Brjuno
condition first introduced in \cite{Ris}.
The regular dependence on the
multiplier holds also in the formal ultradifferentiable case considered in
\cite{CM}.}
ABSTRACT.2 - 26 marzo
> "Linearization of holomorphic
germs with quasi-elliptic fixed points"
>
> Abstract: Let f be a
germ of holomorphic diffeomorphism of \C^n
> with the origin O as
quasi-elliptic fixed point, i.e., so that the
> spectrum of df_O
contains 0 < s eigenvalues satisfying a Brjuno
> condition. We
shall give sufficient conditions for the holomorphic
>
linearization of f valid even when s<
n.
>