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DynamicalSystem

Stephen Crowley edited this page Mar 30, 2023 · 2 revisions

A dynamical system is a mathematical concept used to describe the time-dependent behavior of a system governed by a set of rules or equations. It is a fundamental concept in many areas of science, including physics, engineering, economics, biology, and other disciplines that involve the study of systems evolving over time.

A dynamical system typically consists of:

  • A state space: This is the set of all possible states that the system can be in. The state space can be finite or infinite, discrete or continuous, and may be represented by variables or coordinates.

  • A state: A specific point in the state space that represents the current condition of the system. The state can be described by a set of variables or coordinates, and it fully captures the relevant information about the system at a given time.

  • A rule or a set of equations: These are the mathematical relationships that dictate how the state of the system changes over time. The equations can be deterministic, meaning that they have a unique solution for each initial state, or stochastic, meaning that the future state is determined by a probability distribution.

  • Time: Time can be either continuous or discrete, and it serves as the independent variable that drives the evolution of the system.

The behavior of a dynamical system is studied by analyzing its trajectories or orbits, which are the sequences of states that the system passes through over time. These trajectories can exhibit a wide range of behaviors, from simple, predictable patterns like periodic oscillations to more complex, chaotic behavior.

Dynamical systems theory provides a powerful framework for understanding and predicting the behavior of systems in various fields, and it has applications in areas such as control theory, optimization, statistical mechanics, and the study of chaos and nonlinear dynamics.

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