Dynamıcs on Labels and Unpredıctabılıty (II)
Speaker(s): Marat AKHMET(Middle East Technical University)
Time: 11:00-12:00 April 25, 2024
Venue: Room 29, Quan Zhai, BICMR
Abstract:
We are delivering
theories of two types of chaos, which have been developed in our recent papers.
The first one is the chaos on labels, and the second one is the unpredictable
dynamics. The cornerstone of the newly introduced unpredictable dynamics is the
unpredictable point, which is a specification of the Poisson stable point. Let
us recall that the Poisson stable point is known as the ultimate type of
oscillation in the Poincare-Birkhoff theory. Thus, our suggestions prolong the
line of recurrent motions to a new frontier such that the research joins with
chaos investigation. It is important to emphasize that Devaney's chaos relies
entirely on the collective behavior of orbits, such as sensitivity, dense cycles,
and transitivity. Oppositely, the Poincare chaos is based on the concept of
unpredictability, which is focused uniquely on a single orbit motion. Moreover,
by simulating a solution, we can conclude that not only is chaos present, but
also that motion is unpredictable. This is, from one side, principally new for
chaos study and, from another side, leads us back to the roots of classical
dynamics, which considers a single stable motion as the main object of
discussion. What we are doing is like that of a single electron idea in
physics. In our opinion, the novel motion will make the research of chaos more
beneficial inside of the theoretical study as well as for applications. The
first discoveries have already been made in our papers, where we have provided the
perception of the random processes through the two types of chaos invented for
our research.
Dynamics on labels
introduced in our papers is a universal way to analyze chaos in fractals,
neural networks, and random processes. Theoretically, in the basis of the
dynamics on labels, the abstract similarity dynamics lays, which happens in
abstract similarity sets through the abstract similarity map, and can be
exemplified by the symbolic dynamics, but most formally, as it relates to
symbolic dynamics as integration to summation in calculus. That is, symbolic
dynamics is a special case of abstract similarity dynamics when the labeling
for the set of symbol sequences is maximally simple. Our proposals also surpass
the symbolic dynamics in a methodological sense. To study a motion by symbolic
dynamics, one must project it on the Bernoulli shift along a sequence of
symbols. We avoid a search for projection's characteristics and solve a problem
completely inside of the state space. We are confident that the new method can
be utilized as a universal method for research on the most sophisticated
dynamics as well as a way of chaos initiation in many applications. The domain
structured chaos (chaos on labels) has already been applied for the extension
of chaos in hyperbolic sets, chaotic attractors, fractals, finite-dimensional
cubes, stochastic dynamics, probability, differential equations, and neural
networks.
This talk is
tailored for those who work with the theory of functions, differential
equations, geometry, and the history of mathematics. We will avoid diving into
technical details, focusing instead on the broader implications and
applications of our research.
Bio:
Dr. Marat Akhmet is a mathematics professor
at Middle East Technical University, Ankara, Türkiye. He received his
Bachelor's degree in Mathematics from Aktobe State University, Kazakhstan, and
his Doctorate in Differential Equations and Mathematical Physics from Kyiv
State University, Ukraine.
Dr. Akhmet has been awarded the Science Prize
of TUBITAK (Türkiye, 2015) for his achievements in scientific research and the
Prof. C.S. Hsu Award (UC Berkeley, 2021) for outstanding results in nonlinear
analysis investigations. Has been invited as a Plenary speaker for 17
international conferences in Turkey, Kazakhstan, the USA, France, Italy, and
the UK, and has organized more than 20 international and national scientific
meetings. Dr. Akhmet is passionate about scientific research as well as his
role as a teacher, and he has continually been one of the recipients of the
'Best Performance Award' at Middle East Technical University over the 20 years
of his work there. Dr. Akhmet has mentored 19 Ph.D. students over his career,
who now work in research centers and universities in Türkiye, Kazakhstan, USA,
Saudi Arabia, and Libya.
He solved the Second Peskin conjecture for
integrate-and-fire biological oscillators by a skillful formalization of the
firing connection to achieve synchronization.
Dr. Akhmet made significant contributions to
chaos theory, suggested a method of chaos replication, extended the types of
recurrent motions with a concept of unpredictable points, and developed
domain-structured dynamics as a universal approach in this research area.
In papers and books by the applicant,
fractals are related to Dynamics not only as the results of iterations but also
as their states and orbits. Thus, the beauty of fractals can now also be
extended along the time axis.
He has contributed to the fundamentals of the
theory of discontinuous, almost periodic functions and the solutions of
impulsive systems. He has also introduced and developed the B-equivalence
method for systems with variable impulse moments. The most sophisticated
results were developed for bifurcation problems, discontinuous dynamics with
grazing phenomena, and singularity.
Dr. Akhmet has achieved significant results
for differential equations with piecewise constant argument. The classical
results of the operator theory are now used for this research.
It is important that many of the applicant's
results have been realized in research on chaos and synchronization in areas of
science and industry such as neuroscience, semiconductor gas discharge models,
economics, medicine, and biology.