February 17 - 18, 2020

- Mathematical control theory
- Control theory and mathematics
- Mathematical foundations of control systems
- Mathematics and control engineering
- Application-oriented mathematics
- Analysis and design of control systems
- Mathematics of control, signals, and systems
- Mathematical foundations for control theory
- Dynamic programming
- Pontryaginâ€™s principle
- Linear system theory
- Reachability and controllability
- Nonlinear controllability
- Feedback and stabilization
- Outputs
- Observers and dynamic feedback
- Optimality: value function, multipliers, and minimum-time for linear systems
- Controllability and bang-bang principle
- Linear time-optimal control
- The Pontryagin maximum principle
- Game theory and control systems
- Lie-algebraic accessibility theory
- Feedback linearization
- Controllability of neural networks
- Reachability under input constraints
- Nonlinear feedback design
- Backstepping, damping, and control-lyapunov functions
- Topological obstructions to stabilization
- Lie semigroups and lie groups
- Algebraic geometry
- Dynamical systems
- Complex analysis
- Functional analysis,
- Calculus of variations
- Topology
- Differential geometry
- Probability theory