Aristeidis Leite*
Generalized Lie theory has emerged as a powerful tool in the study of control theory and dynamical systems, providing new methods for understanding the behavior of complex systems that go beyond the traditional framework of Lie groups and algebras. This expanded version of Lie theory, which extends the classical concepts to more general and often nonlinear settings, has profound implications for both the theoretical foundations and practical applications in these fields. Control theory is concerned with the behavior of dynamical systems over time and how to influence that behavior to achieve desired outcomes. At its core, it deals with systems that evolve according to certain rules, typically described by differential equations, and the control inputs that can modify this evolution. Traditional control theory often relies on linear models, where the relationships between the system variables and the control inputs are linear. In these cases, the application of Lie theory is relatively straightforward, as the system’s symmetries and invariants can be captured by linear Lie algebras. However, many real-world systems exhibit nonlinear behavior, where the relationships are far from linear, necessitating the use of generalized Lie theory.
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