81 research outputs found
The Gauss map on a class of interval translation mappings
We study the dynamics of a class of interval translation map on three
intervals. We show that in this class the typical ITM is of finite type (reduce
to an interval exchange transformation) and that the complement contains a
Cantor set. We relate our maps to substitution subshifts. Results on Hausdorff
dimension of the attractor and on unique ergodicity are obtained
Recurrence and lyapunov exponents
We prove two inequalities between the Lyapunov exponents of a diffeomorphism
and its local recurrence properties. We give examples showing that each of the
inequalities is optimal
Complexity and growth for polygonal billiards
We establish a relationship between the word complexity and the number of
generalized diagonals for a polygonal billiard. We conclude that in the
rational case the complexity function has cubic upper and lower bounds. In the
tiling case the complexity has cubic asymptotic growth.Comment: 12 pages, 4 figure
Recurrence in generic staircases
The straight-line flow on almost every staircase and on almost every square
tiled staircase is recurrent. For almost every square tiled staircase the set
of periodic orbits is dense in the phase space
On the resonance eigenstates of an open quantum baker map
We study the resonance eigenstates of a particular quantization of the open
baker map. For any admissible value of Planck's constant, the corresponding
quantum map is a subunitary matrix, and the nonzero component of its spectrum
is contained inside an annulus in the complex plane, . We consider semiclassical sequences of eigenstates, such that the
moduli of their eigenvalues converge to a fixed radius . We prove that, if
the moduli converge to , then the sequence of eigenstates
converges to a fixed phase space measure . The same holds for
sequences with eigenvalue moduli converging to , with a different
limit measure . Both these limiting measures are supported on
fractal sets, which are trapped sets of the classical dynamics. For a general
radius , we identify families of eigenstates with
precise self-similar properties.Comment: 32 pages, 2 figure
Escape orbits and Ergodicity in Infinite Step Billiards
In a previous paper we defined a class of non-compact polygonal billiards,
the infinite step billiards: to a given decreasing sequence of non-negative
numbers , there corresponds a table \Bi := \bigcup_{n\in\N} [n,n+1]
\times [0,p_{n}].
In this article, first we generalize the main result of the previous paper to
a wider class of examples. That is, a.s. there is a unique escape orbit which
belongs to the alpha and omega-limit of every other trajectory. Then, following
a recent work of Troubetzkoy, we prove that generically these systems are
ergodic for almost all initial velocities, and the entropy with respect to a
wide class of ergodic measures is zero.Comment: 27 pages, 8 figure
Ergodicity of certain cocycles over certain interval exchanges
We show that for odd-valued piecewise-constant skew products over a certain
two parameter family of interval exchanges, the skew product is ergodic for a
full-measure choice of parameters
Quantisations of piecewise affine maps on the torus and their quantum limits
For general quantum systems the semiclassical behaviour of eigenfunctions in
relation to the ergodic properties of the underlying classical system is quite
difficult to understand. The Wignerfunctions of eigenstates converge weakly to
invariant measures of the classical system, the so called quantum limits, and
one would like to understand which invariant measures can occur that way,
thereby classifying the semiclassical behaviour of eigenfunctions. We introduce
a class of maps on the torus for whose quantisations we can understand the set
of quantum limits in great detail. In particular we can construct examples of
ergodic maps which have singular ergodic measures as quantum limits, and
examples of non-ergodic maps where arbitrary convex combinations of absolutely
continuous ergodic measures can occur as quantum limits. The maps we quantise
are obtained by cutting and stacking
- …