Special Issue on Dynamical System and Its
Application
In
mathematics, a dynamical system is a
system in which a function describes the time dependence of a point in a
geometrical space. At any given time, a dynamical system has a state given by a
tuple of real numbers (a vector) that can be represented by a point in an
appropriate state space (a geometrical manifold). The evolution rule of the
dynamical system is a function that describes what future states follow from
the current state. The study of dynamical systems is the focus of dynamical
systems theory, which has applications to a wide variety of fields such as
mathematics, physics, biology, chemistry, engineering, economics, and medicine.
Dynamical systems are a fundamental part of chaos theory, logistic map
dynamics, bifurcation theory, the self-assembly process, and the edge of chaos
concept.
In this special issue, we intend to invite front-line
researchers and authors to submit original research and review articles on dynamical system and its application. Potential topics include, but are not limited
to:
-
Bifurcation theory
-
Ergodic systems
-
Nonlinear dynamical systems and chaos
-
Logistic map
-
Stability of the dynamical system
-
Applications of dynamical systems
Authors should read over the journal’s For Authors carefully before submission. Prospective
authors should submit an electronic copy of their complete manuscript through
the journal’s Paper Submission System.
Please kindly notice that the “Special Issue”
under your manuscript title is supposed to be specified and the research field
“Special Issue – Dynamical System and
Its Application” should be chosen during your submission.
According to the
following timetable:
Submission Deadline
|
March 7th, 2018
|
Publication Date
|
April 2018
|
APM Editorial Office
apm@scirp.org