Dr. Cleber Gomes has extensive experience in electronics engineering and research. He has a Ph.D from Tokyo University of Technology and Agriculture and has lived and worked in both Tokyo and Israel for several years, holding positions in research and development at major technology companies. The presentation will discuss dynamical complex systems, using the stock market as an example, and will propose a system for forecasting stock market behavior.
Chaotic system and its Application in CryptographyMuhammad Hamid
A seminar on Chaotic System and Its application in cryptography specially in image encryption. Slide covers
Introduction
Bifurcation Diagram
Lyapnove Exponent
The document discusses the market potential for low-cost cybernetic security solutions embedded in microcontrollers used in Internet of Things (IoT) devices. It estimates that by 2020 there will be around 27 billion low-cost IoT devices using microcontrollers, representing a market opportunity of around 270 million microcontrollers with embedded security. The document also provides an overview of the types of IoT applications that could benefit from more secure microcontrollers and describes some of the key cybersecurity technologies needed for IoT devices.
Boulder County Real Estate Statistics -October 2014Neil Kearney
Boulder Colorado real estate statistics. This presentation will give you a good overview of the Boulder real estate market by showing comparative graphs on a monthly and weekly basis over the last five years. Created and presented by Neil Kearney of Kearney Realty Co. www.NeilKearney.com
The document discusses meditation and its benefits. It provides several quotes and perspectives on meditation. Meditation is described as narrowing one's vision by excluding everything else and focusing on a single thing. It involves being aware of one's thoughts and feelings without being defined by them. Meditation can be part of any activity when one is consciously focused on their actions. Having a silent and stable mind through meditation can help change the world for the better.
1) O documento descreve a trajetória acadêmica e profissional de Dr. Cleber Gomes, com formação em engenharia e experiência no Japão e Israel.
2) A apresentação cobrirá sistemas complexos dinâmicos, o mercado de ações como um sistema desse tipo, a possibilidade de previsão do mercado e o sistema de previsão desenvolvido.
3) É mostrado que sistemas complexos como o mercado de ações podem ter comportamentos aparentemente aleatórios mas esconder uma ordem intrínseca
Chaotic system and its Application in CryptographyMuhammad Hamid
A seminar on Chaotic System and Its application in cryptography specially in image encryption. Slide covers
Introduction
Bifurcation Diagram
Lyapnove Exponent
The document discusses the market potential for low-cost cybernetic security solutions embedded in microcontrollers used in Internet of Things (IoT) devices. It estimates that by 2020 there will be around 27 billion low-cost IoT devices using microcontrollers, representing a market opportunity of around 270 million microcontrollers with embedded security. The document also provides an overview of the types of IoT applications that could benefit from more secure microcontrollers and describes some of the key cybersecurity technologies needed for IoT devices.
Boulder County Real Estate Statistics -October 2014Neil Kearney
Boulder Colorado real estate statistics. This presentation will give you a good overview of the Boulder real estate market by showing comparative graphs on a monthly and weekly basis over the last five years. Created and presented by Neil Kearney of Kearney Realty Co. www.NeilKearney.com
The document discusses meditation and its benefits. It provides several quotes and perspectives on meditation. Meditation is described as narrowing one's vision by excluding everything else and focusing on a single thing. It involves being aware of one's thoughts and feelings without being defined by them. Meditation can be part of any activity when one is consciously focused on their actions. Having a silent and stable mind through meditation can help change the world for the better.
1) O documento descreve a trajetória acadêmica e profissional de Dr. Cleber Gomes, com formação em engenharia e experiência no Japão e Israel.
2) A apresentação cobrirá sistemas complexos dinâmicos, o mercado de ações como um sistema desse tipo, a possibilidade de previsão do mercado e o sistema de previsão desenvolvido.
3) É mostrado que sistemas complexos como o mercado de ações podem ter comportamentos aparentemente aleatórios mas esconder uma ordem intrínseca
What does it mean for something to be a dynamical system What is .pdfvikasbajajhissar
A dynamical system is a mathematical model of a system whose state changes over time. Dynamical systems are described using differential or difference equations. An example of a dynamical system that is sensitive to initial conditions is one that exhibits the butterfly effect, where small changes to the initial state can lead to large changes in the system's behavior over time.
The butterfly effect theory proposes that small initial changes in a system can lead to large unpredictable changes later. This was first proposed by Edward Lorenz to describe how minor perturbations like a butterfly flapping its wings could influence a hurricane weeks later. Related concepts like fractal theory and chaos theory also describe how simple deterministic systems can produce complex, unpredictable long-term behaviors due to sensitivity to initial conditions. The butterfly effect and these related theories have real-world applications in domains like weather modeling, climatology, and computing.
This document provides information about a unit on state-space analysis for an electrical engineering course. It includes the topics that will be covered such as state variables, state-space representation of transfer functions, state transition matrices, and controllability and observability. It defines key concepts like state, state vector, and state space. It explains the importance and advantages of state-space analysis over other methods like using transfer functions. The outcomes of the unit are to learn how to model systems in state-space form and analyze properties like controllability and observability.
Chaos theory deals with nonlinear and complex systems that are highly sensitive to initial conditions. These systems, while deterministic, are largely unpredictable due to this sensitivity. Lorenz discovered this "butterfly effect" through modeling atmospheric convection. Chaotic systems evolve toward attractors, which can be fixed points, limit cycles, or strange attractors exhibiting fractal geometry. This geometry is seen throughout nature. While chaotic systems cannot be precisely predicted, control methods like Ott-Grebogi-Yorke can influence their behavior. Chaos theory has applications across many domains.
Visual Analysis of Non Linear Systems, Chaos, Fractals, Self Similarity
Please subscribe to my YouTube Channel for best training lectures:
https://www.youtube.com/channel/UCRkUJFOsyZG1E1LDWzUr_hw
This presentation introduces chaos theory. It begins with an outline that covers the history, definition, concepts, principles, applications, controls, limitations, and conclusions of chaos theory. It then discusses how Edward Lorenz introduced chaos theory in 1972 by conceptualizing the "Butterfly Effect". Finally, it provides references for further information about chaos theory and its uses.
This document summarizes key concepts related to deterministic systems and chaos theory. It defines deterministic systems as those where future states are fully determined by present conditions without any randomness. Chaos refers to unpredictable behavior in deterministic systems that is highly sensitive to initial conditions. Examples of strange attractors are given, including the Lorenz attractor discovered by Edward Lorenz in 1960 which demonstrated the butterfly effect and chaotic behavior in deterministic systems.
The butterfly effect theory proposes that small initial differences, like the flapping of a butterfly's wings, can lead to large divergences in outcomes over time in highly sensitive systems. Edward Lorenz first theorized this concept and coined the term to describe how seemingly insignificant events can influence complex systems in significant ways. Fractal theory also examines how simple systems can produce complicated results through chaos and sensitive dependence on initial conditions. Chaos theory further develops these ideas, showing how deterministic systems can exhibit unpredictable, chaotic behaviors due to small perturbations in initial values.
From last four decades of research it is well-established that all electrophysiological signals are nonlinear, irregular and aperiodic. Since those signals are used in everyday clinical practice as diagnostic tools (EMG, ECG, EEG), a huge progress in using it in making diagnostic more precise and
This document discusses systems and system modeling. It defines a system as a set of interrelated components working together toward a common goal. A system has boundaries, components that interact, and an environment it interacts with. The document discusses classifying systems as discrete, continuous, or hybrid based on how their state variables change over time. It also defines key system modeling concepts like entities, attributes, activities, events, and state variables.
The matrix geometric method can be used to analyze systems with complex behavior, including those with continuous or infinite state spaces. It involves representing the system as a matrix and using matrix algebra to study long-term behavior. Specifically, it allows analyzing congested systems by modeling them as Markov chains or phase-type distributions, with states representing congestion levels. The transition matrix specifies probabilities of moving between states, and can be used to calculate important metrics like the stationary distribution and expected times between states.
The document discusses systems theory and provides definitions and principles about systems. It defines a system as a collection of components bound more strongly to each other than their environment. Systems can exist because of stable components and binding forces. Complex systems can exhibit emergent behaviors from simple local rules operating at a large scale. All complex adaptive systems use some form of computation, and the theory of evolution describes how selective pressure favors replication of better adapted systems in large ecosystems of variable systems.
In the previous chapter, we showed how a game’s internal economy is one important aspect of its mechanics. We used diagrams to visualize economic structures
and their effects. In this chapter, we introduce the Machinations framework, or
visual language, to formalize this perspective on game mechanics. Machinations
was devised by Joris Dormans to help designers and students of game design create,
document, simulate, and test the internal economy of a game. At the core of this
framework are Machinations diagrams, a way of representing the internal economy
of a game visually. The advantage of Machinations diagrams is that they have a
clearly defined syntax. This lets you use Machinations diagrams to record and communicate designs in a clear and consistent way.
Based on book Game Mechanics - Advanced Game Design - E. Adams and J. Dormans. All credited to them
The document discusses mathematical modeling of physical control systems. It begins by explaining that the first step is to develop a linear mathematical model around an operating point to analyze the system. It then discusses different types of physical variables and components that can be modeled, including electrical, mechanical, thermal and fluidic devices. Differential equations relating inputs and outputs are obtained using physics laws. The document also covers modeling translational and rotational mechanical systems using elements like mass, spring and damper. It discusses different variable types, analogies, transfer functions and block diagram representation of systems. It provides examples of reducing complex block diagrams to obtain closed loop transfer functions.
The document discusses mathematical modeling of physical control systems. It begins by explaining that the first step is to develop a linear mathematical model around an operating point to analyze the system. It then discusses different types of physical variables and components that can be modeled, including electrical, mechanical, thermal and fluidic devices. Differential equations are used to model the input-output relationships. The document also covers linear time-invariant and time-varying models, transfer functions, block diagram modeling, and open-loop and closed-loop system properties.
This document is a study of chaos in induction machine drives conducted under the guidance of Dr. Bharat Bhushan. It was prepared by Mirza Abdul Waris Beigh, Aakash Aggarwal, Gopal Bharadwaj, and Mohan Lal. The study analyzes the chaotic behavior of a nonlinear dynamical model of an induction machine using techniques like Hopf bifurcations analysis, phase plots, and Lyapunov exponents. It finds that the system exhibits chaos with one Lyapunov exponent being positive. However, by increasing the load parameter, all exponents can be made negative, removing chaos from the system. Further work proposed includes designing a sliding mode controller and analyzing parameter variation to eliminate chaos
The document discusses forced vibrations of damped, single degree of freedom linear spring mass systems. It derives the equations of motion for three types of forcing - external forcing, base excitation, and rotor excitation. It presents the steady state solutions and discusses key features, including that the response frequency matches the forcing frequency. The maximum response occurs at resonance when the forcing frequency matches the natural frequency. Engineering applications include designing systems to minimize vibrations by increasing stiffness/natural frequency and damping.
The document provides an overview of state modeling and interaction modeling techniques. It defines key concepts like events, conditions, states, and transitions that are used in state diagrams. It also discusses use case diagrams, which model user interactions with a system through actors and use cases. The document explains that state diagrams describe the behavior and life cycles of objects in response to events, while use case and interaction diagrams elaborate the functional requirements and interactions between users and a system.
Self organization in electrochemical systems iSpringer
This document provides definitions and concepts related to nonlinear dynamics and self-organization. It discusses three key conditions for self-organization: an irreversible process, nonlinear dynamics, and feedback loops. It also defines important terms like bifurcation points, where a small change in a control parameter causes a qualitative change in behavior, such as the emergence of oscillations. Bifurcations can lead to phenomena like hysteresis, bistability, and multistability. Stability is also a crucial concept, as only stable states can be observed; unstable states will not survive fluctuations.
What does it mean for something to be a dynamical system What is .pdfvikasbajajhissar
A dynamical system is a mathematical model of a system whose state changes over time. Dynamical systems are described using differential or difference equations. An example of a dynamical system that is sensitive to initial conditions is one that exhibits the butterfly effect, where small changes to the initial state can lead to large changes in the system's behavior over time.
The butterfly effect theory proposes that small initial changes in a system can lead to large unpredictable changes later. This was first proposed by Edward Lorenz to describe how minor perturbations like a butterfly flapping its wings could influence a hurricane weeks later. Related concepts like fractal theory and chaos theory also describe how simple deterministic systems can produce complex, unpredictable long-term behaviors due to sensitivity to initial conditions. The butterfly effect and these related theories have real-world applications in domains like weather modeling, climatology, and computing.
This document provides information about a unit on state-space analysis for an electrical engineering course. It includes the topics that will be covered such as state variables, state-space representation of transfer functions, state transition matrices, and controllability and observability. It defines key concepts like state, state vector, and state space. It explains the importance and advantages of state-space analysis over other methods like using transfer functions. The outcomes of the unit are to learn how to model systems in state-space form and analyze properties like controllability and observability.
Chaos theory deals with nonlinear and complex systems that are highly sensitive to initial conditions. These systems, while deterministic, are largely unpredictable due to this sensitivity. Lorenz discovered this "butterfly effect" through modeling atmospheric convection. Chaotic systems evolve toward attractors, which can be fixed points, limit cycles, or strange attractors exhibiting fractal geometry. This geometry is seen throughout nature. While chaotic systems cannot be precisely predicted, control methods like Ott-Grebogi-Yorke can influence their behavior. Chaos theory has applications across many domains.
Visual Analysis of Non Linear Systems, Chaos, Fractals, Self Similarity
Please subscribe to my YouTube Channel for best training lectures:
https://www.youtube.com/channel/UCRkUJFOsyZG1E1LDWzUr_hw
This presentation introduces chaos theory. It begins with an outline that covers the history, definition, concepts, principles, applications, controls, limitations, and conclusions of chaos theory. It then discusses how Edward Lorenz introduced chaos theory in 1972 by conceptualizing the "Butterfly Effect". Finally, it provides references for further information about chaos theory and its uses.
This document summarizes key concepts related to deterministic systems and chaos theory. It defines deterministic systems as those where future states are fully determined by present conditions without any randomness. Chaos refers to unpredictable behavior in deterministic systems that is highly sensitive to initial conditions. Examples of strange attractors are given, including the Lorenz attractor discovered by Edward Lorenz in 1960 which demonstrated the butterfly effect and chaotic behavior in deterministic systems.
The butterfly effect theory proposes that small initial differences, like the flapping of a butterfly's wings, can lead to large divergences in outcomes over time in highly sensitive systems. Edward Lorenz first theorized this concept and coined the term to describe how seemingly insignificant events can influence complex systems in significant ways. Fractal theory also examines how simple systems can produce complicated results through chaos and sensitive dependence on initial conditions. Chaos theory further develops these ideas, showing how deterministic systems can exhibit unpredictable, chaotic behaviors due to small perturbations in initial values.
From last four decades of research it is well-established that all electrophysiological signals are nonlinear, irregular and aperiodic. Since those signals are used in everyday clinical practice as diagnostic tools (EMG, ECG, EEG), a huge progress in using it in making diagnostic more precise and
This document discusses systems and system modeling. It defines a system as a set of interrelated components working together toward a common goal. A system has boundaries, components that interact, and an environment it interacts with. The document discusses classifying systems as discrete, continuous, or hybrid based on how their state variables change over time. It also defines key system modeling concepts like entities, attributes, activities, events, and state variables.
The matrix geometric method can be used to analyze systems with complex behavior, including those with continuous or infinite state spaces. It involves representing the system as a matrix and using matrix algebra to study long-term behavior. Specifically, it allows analyzing congested systems by modeling them as Markov chains or phase-type distributions, with states representing congestion levels. The transition matrix specifies probabilities of moving between states, and can be used to calculate important metrics like the stationary distribution and expected times between states.
The document discusses systems theory and provides definitions and principles about systems. It defines a system as a collection of components bound more strongly to each other than their environment. Systems can exist because of stable components and binding forces. Complex systems can exhibit emergent behaviors from simple local rules operating at a large scale. All complex adaptive systems use some form of computation, and the theory of evolution describes how selective pressure favors replication of better adapted systems in large ecosystems of variable systems.
In the previous chapter, we showed how a game’s internal economy is one important aspect of its mechanics. We used diagrams to visualize economic structures
and their effects. In this chapter, we introduce the Machinations framework, or
visual language, to formalize this perspective on game mechanics. Machinations
was devised by Joris Dormans to help designers and students of game design create,
document, simulate, and test the internal economy of a game. At the core of this
framework are Machinations diagrams, a way of representing the internal economy
of a game visually. The advantage of Machinations diagrams is that they have a
clearly defined syntax. This lets you use Machinations diagrams to record and communicate designs in a clear and consistent way.
Based on book Game Mechanics - Advanced Game Design - E. Adams and J. Dormans. All credited to them
The document discusses mathematical modeling of physical control systems. It begins by explaining that the first step is to develop a linear mathematical model around an operating point to analyze the system. It then discusses different types of physical variables and components that can be modeled, including electrical, mechanical, thermal and fluidic devices. Differential equations relating inputs and outputs are obtained using physics laws. The document also covers modeling translational and rotational mechanical systems using elements like mass, spring and damper. It discusses different variable types, analogies, transfer functions and block diagram representation of systems. It provides examples of reducing complex block diagrams to obtain closed loop transfer functions.
The document discusses mathematical modeling of physical control systems. It begins by explaining that the first step is to develop a linear mathematical model around an operating point to analyze the system. It then discusses different types of physical variables and components that can be modeled, including electrical, mechanical, thermal and fluidic devices. Differential equations are used to model the input-output relationships. The document also covers linear time-invariant and time-varying models, transfer functions, block diagram modeling, and open-loop and closed-loop system properties.
This document is a study of chaos in induction machine drives conducted under the guidance of Dr. Bharat Bhushan. It was prepared by Mirza Abdul Waris Beigh, Aakash Aggarwal, Gopal Bharadwaj, and Mohan Lal. The study analyzes the chaotic behavior of a nonlinear dynamical model of an induction machine using techniques like Hopf bifurcations analysis, phase plots, and Lyapunov exponents. It finds that the system exhibits chaos with one Lyapunov exponent being positive. However, by increasing the load parameter, all exponents can be made negative, removing chaos from the system. Further work proposed includes designing a sliding mode controller and analyzing parameter variation to eliminate chaos
The document discusses forced vibrations of damped, single degree of freedom linear spring mass systems. It derives the equations of motion for three types of forcing - external forcing, base excitation, and rotor excitation. It presents the steady state solutions and discusses key features, including that the response frequency matches the forcing frequency. The maximum response occurs at resonance when the forcing frequency matches the natural frequency. Engineering applications include designing systems to minimize vibrations by increasing stiffness/natural frequency and damping.
The document provides an overview of state modeling and interaction modeling techniques. It defines key concepts like events, conditions, states, and transitions that are used in state diagrams. It also discusses use case diagrams, which model user interactions with a system through actors and use cases. The document explains that state diagrams describe the behavior and life cycles of objects in response to events, while use case and interaction diagrams elaborate the functional requirements and interactions between users and a system.
Self organization in electrochemical systems iSpringer
This document provides definitions and concepts related to nonlinear dynamics and self-organization. It discusses three key conditions for self-organization: an irreversible process, nonlinear dynamics, and feedback loops. It also defines important terms like bifurcation points, where a small change in a control parameter causes a qualitative change in behavior, such as the emergence of oscillations. Bifurcations can lead to phenomena like hysteresis, bistability, and multistability. Stability is also a crucial concept, as only stable states can be observed; unstable states will not survive fluctuations.
1. • Dr. Cleber Gomes is an Electronic
Engineer graduated from UFRJ and has
a Ph.D. from Tokyo University of
Technology and Agriculture. He lived
for 7 years in Tokyo where worked as a
researcher in top companies as NEC and
Sharp. He also lived for 7 years in Israel,
where occupied positions of managing
and of research and development in
software companies in the fields of
pattern recognition, artificial inteligence,
distributed processing and security for
the Unix system.
2. The following presentation will cover the topics below:
• Dynamical Complex Systems – The Logic of the Irrational
• The Stock Market as a Dynamical Complex System
• Can the Stock Market be predicted?
• Predicting the Stock Market
• Our Forecasting System
• Conclusions and Future Steps
3. Dynamical Complex Systems – The Logic of the Irrational
• Dynamical Complex Systems are those systems capable of presenting
a behavior that, though apparently random, may often hide an
intrinsicaly order difficult to be understood at first sight. Some
examples of this kind of systems are the climate, the immunologic
system, the human society and the stock market among others. They
present common characteristics that make them inherently
unpredictable in the long term, as for example the non-linearity.
4. • In non-linear systems, the output is not proportional to the input as it
happens in linear systems, and therefore, small changes in the input
conditions may lead to big changes in the output conditions:
5. • A good example of this effect, and easily visualized, is the avalanche
that may take place in a sand pile as result of the fall of one grain only:
6. • Besides this non-linear effect, dynamical complex systems are
characterized also by a feedback mechanism between the output and
the input of the system. That is, besides the fact that small variations in
the input may cause big fluctuations in the output, due to the non-
linearity, these fluctuations in the output are transferred again to the
input, influencing the system ad-infinitum:
7. • That is what leads to the unpredictability of such systems in the long
term, because small changes in the initial conditions are exponentially
amplified with time, originating totally different behaviors in the future:
8. • Such characteristic of dynamical complex systems became also known
as “The Butterfly Effect”, defined by Edward Lorenz in the following
terms:
The flapping of a butterfly’s wing produces today a minuscule alteration in the
state of the atmosphere. After some time, what the atmosphere effectively does
diverges from what it would have done, if it wasn’t for that alteration.
Therefore, after a month, a hurricane that would have devastated Indonesia’s
coast doesn’t happen. Or it happens one that normally wouldn’t.
9. • Even though dynamical complex systems are unpredictable in the long
term, it may be possible to predict them in the short and medium
terms, due to the order they present in their behavior. As random this
behavior may appear to be, it often hides a certain intrinsic order. This
order is generally not visible when we look at the evolution of the
system in time, but emerges when we draw its trajectory in a phase
space.
10. • The phase space is nothing more than a graphic where each dimension
corresponds to one variable or parameter of the system, and the
variables are drawn against each other to show the trajectory of the
system as a whole:
11. • When the evolution of a system in phase space always tends to follow a
certain preferred trajectory, it is said that such trajectory represents the
attractor of the system. The attractor is a trajectory or position of
equilibrium within phase space, in such a way that even if other position
is the initial one, the system always evolves towards it. A simple
example of an attractor would be the center of a spherical basin
containing a small ball:
12. • Depending on the system, attractors can be regular as the orbit of
planets, periodical as the cycle of oscillation of pendulums, or can
represent an infinite sequence of states that, though never repeating
itself, remains always contained within the boundaries of a restricted
area within phase space:
13. • We call this last case a strange attractor. In dynamical complex systems
that present a strange attractor, there is an intrinsic order because the
trajectory followed by the system is limited to the attractor and,
consequently, it may to a certain extent be predicted.
14. • The first to analyze deeply dynamical complex systems was the
american meteorologist Edward Lorenz, who, during the sixties, studied
a model of the climate in three dimensions, and found out that the
variables x, y and z of such model always followed a trajectory in phase
space that resembled a double spiral:
15. • Lorenz had discovered the first strange attractor of a dynamical complex
system simulated in a computer, which became known as the Lorenz
attractor. The model studied by Lorenz consisted in the following set of
non-linear differential equations:
• dx / dt = a (y - x)
• dy / dt = x (b - z) - y
• dz / dt = xy - c z
• a,b,c constants.
16. • As we can see, the equations of Lorenz model describe a system of the
kind mentioned before, non-linear and based on a feedback mechanism.
The feedback mechanism is present because at each moment the
variation of the parameters x, y and z is used to determine their values in
the next iteration:
17. • The computer simulation of these equations can give us the opportunity
to observe a simplification of the kind of behavior that is generally
presented by real dynamical complex systems, as for instance the stock
market. It is possible to visualize that such behavior is characterized by
a great sensibility to variations in the initial values of the system’s
parameters, and by the non-periodic and seemingly random way these
parameters evolve with time. To illustrate this kind of behavior, we
prepared a set of java applets to simulate Lorenz equations.
18. • The first applet to the left shows the trajectory of the system in phase
space, where we draw the parameters x+y against z. The second applet
shows the same trajectory with time, in the graphic where we draw
x+y+z against t. The third applet shows the summation of the initial
values of the variables. These initial values of x, y and z are determined
by the position of the mouse within phase space:
19. • When we click the mouse at the same point of phase space three times
in a rapid sequence, we initialize the system with three sets of initial
values for x, y e z that, though distinct, are very close to each other. We
obtain therefore three initial conditions almost identical, making it
possible to observe the sensibility of the system to small variations in its
initial conditions.
20. • The behaviors of the system for the three sets of initial conditions are
represented below by the red, green and blue lines. We observe then,
that in their initial stage, the three systems evolve together:
21. • And then, after a short period of time, they diverge abruptly:
22. • For, in the future, presenting totally different behaviors. We have then,
an illustration of how the future behavior of this kind of system is
strongly influenced by small changes in its initial conditions:
23. • Besides the sensibility to initial conditions, other interesting
characteristic of dynamical complex systems may be also observed as
time passes. After a longer period of time, it is possible to observe in the
applet to the right how the behavior of the system against time seems to
be a totally disorderly and random signal. However, despite this
apparent randomness, the attractor visible in phase space to the left
demonstrates clearly that there is an order hidden in this behavior:
24. • Both applets show the evolution of the same signal, but represented in
two different ways. T represents the transformation, or change of
coordinates, that makes the attractor of the system visible, and thus
makes it possible for the order hidden in the behavior of the signal to
emerge:
25. • That is, though appearing to be random when observed through time,
systems like this present actually an ordered behavior that is always
attracted towards a finite structure, the strange attractor of the system. In
this case, the attractor that denotes the order inherent to the system is the
Lorenz attractor.
26. • Thus, though the behavior of dynamical complex systems never repeats
itself, short-term prediction is in principle possible. The possibility of
prediction exists due to the order inherent to such systems, which must
be extracted from their behavior by the correct transformation. In the
case of a simple system as that represented by Lorenz equations, this
transformation T is the mere change of coordinates that makes it
possible to find the attractor of the system. However, for real-life
systems, like those found in nature and the financial markets, T is of
difficult solution, demanding several processing stages. In the rest of the
presentation, we will demonstrate a prediction system that tries to
solve the transformation T, thus making it possible for the hidden
order within the stock market to emerge.
27. The Stock Market as a Dynamical Complex System
• The Stock Market is a game of great complexity, consisting of a large
number of human agents that buy and sell stocks, by following their
individual expectations with regard to the future behavior of prices.
The agents who operate in this market present, for being human, a
tendency to base their decisions on emotional factors, as fear and
euphoria, which can not be described in a linear fashion.
28. • For instance, the operators holding a certain stock that has suffered a
great fall yesterday, will probably try selling it today, motivated by the
expectation or fear that the falling will continue. Some will wait longer
than others to sell, and some will do so only if the price falls beyond a
certain level, or stop, attaching a high degree of non-linearity to the
process. This collective propensity for selling will, in its turn,
accelerate the falling of prices in a positive feedback process.
29. • This kind of feedback process is responsible for the so-called herd
effect. In this process, the progressive falling of a stock’s price P
increases the expectation of fall EF the market operators hold related to
the stock, what in turn reinforces the falling tendency:
30. • Such feedback mechanism, together with the non-linearity inherent to
human decisions, is what makes the stock market behave basically as
a dynamical complex system.
31. Can the Stock Market be predicted?
• If the stock market really behaves as a dynamical complex system,
there may be an intrinsic order behind the appearing randomness of
stocks’ prices, which makes short-term predictions possible. If such
order really exists, it is due to the non-instantaneous way people react
to new information, not taking decisions until new tendencies emerge,
and then collaborating to strengthen such tendencies. If that is the
case, then stocks’ prices are not random, behaving as a chance walk,
but present a memory period during which past events keep
influencing future events.
32. • There is a statistical parameter, known as Hurst Exponent (H), which
can be used to measure the presence of a bias, or memory effect, in
temporal series that behave seemingly as chance walks. The Hurst
Exponent was created by Harold Hurst, a hydrologist who, while
studying Nile’s flow patterns, discovered that several natural systems
follow the pattern of a biased chance walk, or a tendency with
superposed noise. H, then, would be useful to measure the relationship
between the strength of tendency and the noise level in the behavior of
such systems.
33. • The value of H belongs in the interval between 0 and 1, and can be
understood as the probability that an increase in the level of a signal
today will repeat itself within a certain time. When H is equal to 0,5,
there is a 50% probability of repetition, or the signal is random. For H
larger than 0,5, as the probability of repetition is higher than 50%, the
signal is not random and presents the kind of behavior called
persistent. For values lower than 0,5, the signal is called anti-
persistent, or there is a probability higher than 50% that increases
today lead to decreases after the considered time period.
34. • It is easy to understand that the value of H of a signal depends on the
repetition period, or cycle, being analyzed. For instance, a signal may
present a tendency to repeat peaks in a weekly cycle but to be
completely random on the daily. In that case, we would have H equal
to 0,5 for the daily cycle and larger than 0,5 for the weekly cycle.
35. • In the case of a sine wave, for example, we have H equal to 1 for a
cycle equal to the wave period, and equal to 0 for a cycle equal to half
period. That is because we can always expect a peak today to be
followed by another within 1 wave period, and by a valley after half
period:
36. • In the case of more complex signals, as for example temporal series of
stocks’ prices, we can only estimate H as the average probability of
repetition for highs or lows within several different cycle lengths. Given
H, we can say for instance, that there is a 70% probability that a high
today will lead to a high some day in the next month. It is, however,
impossible to precise exactly when such high will occur.
37. • Therefore, even though H can not be used directly for the purpose of
prediction, it can be used to test the hypothesis that prices are not
random, but present an intrinsic order, and that, consequently,
prediction is not impossible. With this purpose, we measured H for 6
stocks negotiated in the Bovespa, taking into account their prices
between January 2003 and December 2004. The tested stocks are the
following:
38. • The following graphics show the results of H. These graphics represent
the average values of H for several different cycle ranges. The ranges
go from 2 to 12 days up to the extension of the whole temporal series.
39. • For Petrobras, we found the maximum value of H to be equal to 0,75,
for the range between 2 and 12 days. That is, in the case of a high today,
there is a 75% probability of a high sometime between tomorrow and 12
days in the future:
40. • For Embraer, we found the maximum value of H to be equal to 0,77, for
the range between 2 and 12 days. That is, in the case of a high today,
there is a 77% probability of a high sometime between tomorrow and 12
days in the future:
41. • For Vale, we found the maximum value of H to be equal to 0,77, for the
range between 2 and 13 days:
42. • For Siderúrgica de Tubarão, we found the maximum value of H to be
equal to 0,77, for the range between 2 and 12 days:
43. • For Eletropaulo, we found the maximum value of H to be equal to 0,76,
for the range between 2 and 12 days:
44. • For Telemar, we found the maximum value of H to be equal to 0,74, for
the range between 2 and 12 days. That is, in the case of a high today,
there is a 74% probability of a high sometime between tomorrow and 12
days in the future:
45. • As we can see, for all 6 analyzed stocks there is a strong probability,
between 70 and 80%, of repetition of today’s tendency during the next
10 days approximately. Moreover, this probability decreases rapidly the
further in the future we look. In other words, the stocks show a strong
short-term memory effect.
46. • These results are meaningful for proving that stocks’ prices do not vary
randomly, but behave following an inherent order as it happens with
dynamical complex systems. For effectively predicting their future
behavior it is necessary, however, to develop the correct
transformations, or models, capable to detect such order and to make
it intelligible.
47. Predicting the Stock Market
• There are basically three main schools for analyzing the stock market,
which try to predict its future behavior. Each one of them offers its
own arsenal of methods and techniques for guiding efficient capital
allocation, with the purpose of maximizing profit and minimizing risk.
Two of the schools, the fundamentalist and the graphical, are widely
known, while the third, which is concerned with the non-linear
analysis of temporal series, is not so commonly used.
48. • The fundamentalist analysis is based on informations about the
financial health of companies, as profitability, cash generation and
debt, to select the stocks with higher probability of gain and less risk.
Its greater advantage is that, most of times, the long-term behavior of
stocks reflects well the fundaments of their respective companies. Its
disadvantage, however, is that the fundamentalist analysis can not
predict medium and short-term price variations, which are more
influenced by strong non-linear factors.
49. • The graphical analysis, on its turn, tries to predict those medium and
short-term price variations, based on the attempt of recognizing
graphical patterns on the prices of stocks. These patterns, because of
presenting a tendency for repetition, would be useful as good
guidelines to indicate prices’ future behavior. The advantage of
graphical analysis is the relative simplicity and facility encountered by
analysts to understand and use its tools and results. Its main
disadvantage, however, is also due to the large dissemination of those
tools, because no analyst can achieve a consistent advantage over the
others by using a technology known by all.
50. • A good analogy of such point of view would be a poker game during
which one of the players suddenly acquires the ability to see through the
first card of its opponents. As long as he is the only one capable of that,
he will have an expressive advantage over the others and probably will
make a lot of money on the long run:
51. • However, as the others learn the same trick, all players will again move
into an equilibrium position, in which nobody attains a consistent
advantage beyond one’s own talent:
52. • The non-linear analysis, on its turn, treats temporal series of prices as
any other kind of signal to be analyzed through advanced and relatively
new techniques from Information Technology. Such techniques include
Chaos Theory, Neural Nets, Genetic Algorithms and Fuzzy Logic for
signal processing and pattern recognition. The advantage of this kind of
technology is its non-linear and multidimensional nature, which, for
treating the stock market as the dynamical complex system it basically
is, stands a better chance to effectively predict the medium and short-
term behaviors of prices. However, the impossibility of long-term
predictions still remains, due to the sensibility to initial conditions
inherent to the own market.
53. • From the user’s point of view, the relative complexity and difficulty of
understanding such tools and their results, are both an advantage and a
disadvantage. Disadvantage due to the difficulty encountered in using
the related techniques, but advantage due to the acquisition by those
analysts capable of mastering them, of a more powerful and consistent
weapon to be used in the market’s game.
54. • Back to the poker game analogy, mastering the non-linear analysis
techniques would be equivalent to obtaining the ability to see through
opponents’ first and second cards:
55. • In the next slides, we will describe the functioning and results obtained
with our prediction system, which was designed based on the state-of-
the-art technologies used in non-linear analysis. We believe that
results demonstrated so far prove that it is possible to obtain, through
the use of such techniques, that small advantage which, like in the game
of poker, can guarantee consistent profits in the stock market.
57. • In our system the signal passes through a series of processing layers,
becoming more intelligent, or ordered, on its way from lower to higher
level stages. Thus, the initial temporal series of stock prices produces at
the end buying and selling signals for each analyzed company:
58. • Our system was developed along the following lines:
• Maximizing the relationship between profit and risk of
trades.
• Minimizing the number of trades when possible.
• Adapting the processing models to each stock’s individual
characteristics.
• Adapting the processing models to market’s current
conditions.
59. • The following figure shows the simplified system architecture and its
stages. The double spiral exemplifies the order representing structure, or
atractor of the input temporal series, to be “understood” by the system:
60. • In case of complex signals like a stock price series, such atractor is
probably not a stationary one like Lorenz double spiral, but varies with
time instead, denoting an order structure in constant mutation.
Predicting the behavior of stocks becomes then, analogous to trying to
hit the center of a moving target:
61. • Therefore, it is important to give to the prediction system’s internal
models the capability of dynamical adaptation to the current
conditions of the market.
• Besides, the prediction system must also be able to adapt its own
internal structure to the individual characteristics of each analyzed
stock. The behavior of each stock is directly influenced by the
expectation of the agents regarding its evolution with time. Thus, each
stock ends up acquiring its own ”personality” which must be captured
by the system.
62. Conclusions and Future Steps
• Judging by the results obtained by our system until now, we believe
having developed a technological platform for predicting the stock
market, capable of demonstrating a high relationship between
probability of gain and associated risk.
63. • Based on the premise that the fundamental dynamics behind stock
market agents behavior is independent from geographic location, being
though influenced by external factors, as for instance the cultural ones,
we developed a system that seeks to capture the essence of that
dynamics, while keeping the capability to adapt to its local and
time variations.
64. • Therefore, due to the flexibility of the used architecture, it will be
possible to analyze a growing number of assets, negotiated in the
most important markets in the world, as for instance NYSE,
NASDAQ, Frankfurt, London, Tokyo, Madrid, Paris etc. The analysis
will also be extendable to all operational time horizons, including
intra-day, short and medium terms.