284 research outputs found
On cross-ratio distortion and Schwarz derivative
We prove asymptotic estimates for the cross-ratio distortion with respect to
a smooth or holomorphic function in terms of its Schwarz derivative.Comment: the spelling of the name `Schwarz' correcte
Herman's Theory Revisited
We prove that a -smooth orientation-preserving circle
diffeomorphism with rotation number in Diophantine class ,
, is -smoothly conjugate to a rigid
rotation. We also derive the most precise version of Denjoy's inequality for
such diffeomorphisms.Comment: 10 page
Holomorphic linearization of commuting germs of holomorphic maps
Let be germs of biholomorphisms of \C^n fixing the
origin. We investigate the shape a (formal) simultaneous linearization of the
given germs can have, and we prove that if commute and their
linear parts are almost simultaneously Jordanizable then they are
simultaneously formally linearizable. We next introduce a simultaneous
Brjuno-type condition and prove that, in case the linear terms of the germs are
diagonalizable, if the germs commutes and our Brjuno-type condition holds, then
they are holomorphically simultaneously linerizable. This answers to a
multi-dimensional version of a problem raised by Moser.Comment: 24 pages; final version with erratum (My original paper failed to
cite the work of L. Stolovitch [ArXiv:math/0506052v2]); J. Geom. Anal. 201
Renormalisation scheme for vector fields on T2 with a diophantine frequency
We construct a rigorous renormalisation scheme for analytic vector fields on
the 2-torus of Poincare type. We show that iterating this procedure there is
convergence to a limit set with a ``Gauss map'' dynamics on it, related to the
continued fraction expansion of the slope of the frequencies. This is valid for
diophantine frequency vectors.Comment: final versio
Local dynamics for fibered holomorphic transformations
Fibered holomorphic dynamics are skew-product transformations over an
irrational rotation, whose fibers are holomorphic functions. In this paper we
study such a dynamics on a neighborhood of an invariant curve. We obtain some
results analogous to the results in the non fibered case
Affine interval exchange maps with a wandering interval
For almost all interval exchange maps T_0, with combinatorics of genus g>=2,
we construct affine interval exchange maps T which are semi-conjugate to T_0
and have a wandering interval.Comment: 43 pages, 1 figur
Universal Mandelbrot Set as a Model of Phase Transition Theory
The study of Mandelbrot Sets (MS) is a promising new approach to the phase
transition theory. We suggest two improvements which drastically simplify the
construction of MS. They could be used to modify the existing computer programs
so that they start building MS properly not only for the simplest families.
This allows us to add one more parameter to the base function of MS and
demonstrate that this is not enough to make the phase diagram connectedComment: 5 pages, 3 figure
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