1,393,905 research outputs found
Perturbations of discrete lattices and almost periodic sets
A discrete set in the -dimensional Euclidian space is {\it almost
periodic}, if the measure with the unite masses at points of the set is almost
periodic in the weak sense. We propose to construct positive almost periodic
discrete sets as an almost periodic perturbation of a full rank discrete
lattice. Also we prove that each almost periodic discrete set on the real axes
is an almost periodic perturbation of some arithmetic progression.
Next, we consider signed almost periodic discrete sets, i.e., when the signed
measure with masses at points of a discrete set is almost periodic. We
construct a signed discrete set that is not almost periodic, while the
corresponding signed measure is almost periodic in the sense of distributions.
Also, we construct a signed almost periodic discrete set such that the measure
with masses +1 at all points of the set is not almost periodic.Comment: 6 page
Periodic and eventually periodic points of affine infra-nilmanifold endomorphisms
In this paper, we study the periodic and eventually periodic points of affine
infra-nilmanifold endomorphisms. On the one hand, we give a sufficient
condition for a point of the infra-nilmanifold to be (eventually) periodic. In
this way we show that if an affine infra-nilmanifold endomorphism has a
periodic point, then its set of periodic points forms a dense subset of the
manifold. On the other hand, we deduce a necessary condition for eventually
periodic points from which a full description of the set of eventually periodic
points follows for an arbitrary affine infra-nilmanifold endomorphism.Comment: 18 page
Locally periodic unfolding method and two-scale convergence on surfaces of locally periodic microstructures
In this paper we generalize the periodic unfolding method and the notion of
two-scale convergence on surfaces of periodic microstructures to locally
periodic situations. The methods that we introduce allow us to consider a wide
range of non-periodic microstructures, especially to derive macroscopic
equations for problems posed in domains with perforations distributed
non-periodically. Using the methods of locally periodic two-scale convergence
(l-t-s) on oscillating surfaces and the locally periodic (l-p) boundary
unfolding operator, we are able to analyze differential equations defined on
boundaries of non-periodic microstructures and consider non-homogeneous Neumann
conditions on the boundaries of perforations, distributed non-periodically
Periodic correlation structures in bacterial and archaeal complete genomes
The periodic transference of nucleotide strings in bacterial and archaeal
complete genomes is investigated by using the metric representation and the
recurrence plot method. The generated periodic correlation structures exhibit
four kinds of fundamental transferring characteristics: a single increasing
period, several increasing periods, an increasing quasi-period and almost
noincreasing period. The mechanism of the periodic transference is further
analyzed by determining all long periodic nucleotide strings in the bacterial
and archaeal complete genomes and is explained as follows: both the repetition
of basic periodic nucleotide strings and the transference of non-periodic
nucleotide strings would form the periodic correlation structures with
approximately the same increasing periods.Comment: 23 pages, 6 figures, 2 table
Replicate Periodic Windows in the Parameter Space of Driven Oscillators
In the bi-dimensional parameter space of driven oscillators, shrimp-shaped
periodic windows are immersed in chaotic regions. For two of these oscillators,
namely, Duffing and Josephson junction, we show that a weak harmonic
perturbation replicates these periodic windows giving rise to parameter regions
correspondent to periodic orbits. The new windows are composed of parameters
whose periodic orbits have periodicity and pattern similar to stable and
unstable periodic orbits already existent for the unperturbed oscillator. These
features indicate that the reported replicate periodic windows are associated
with chaos control of the considered oscillators
- …