Popis: |
We introduce and analyze the concept of tracking controllability, where the objective is for the state of a control system, or some projection thereof, to follow a given trajectory within a specified time horizon. By leveraging duality, we characterize tracking controllability through a non-standard observability inequality for the adjoint system. This characterization facilitates the development of a systematic approach for constructing controls with minimal norm. However, achieving such an observability property is challenging. To address this, we utilize the classical Brunovsk\'y canonical form for control systems, specifically focusing on the case of scalar controls. Our findings reveal that tracking control inherently involves a loss of regularity in the controls. This phenomenon is highly sensitive to the system's structure and the interaction between the projection to be tracked and the system. |