When a control system has all its vector fields tangent to the level set of a given smooth function at a point , under appropriate assumptions that function can still have a negative rate of decrease with respect to the trajectories of the control system in an appropriate sense. In the case when the system is symmetric and has a decrease rate of the second order, we characterise this fact and investigate the existence of a best possible rate in the class of piecewise constant controls. The problem turns out to be purely algebraic and depends on the eigenvalues of matrices constructed from a basis matrix whose elements are the second order Lie derivatives of at with respect to the vector fields of the system.
On the optimal second order decrease rate for nonlinear and symmetric control systems
Mauro Costantini;Pierpaolo Soravia
2024
Abstract
When a control system has all its vector fields tangent to the level set of a given smooth function at a point , under appropriate assumptions that function can still have a negative rate of decrease with respect to the trajectories of the control system in an appropriate sense. In the case when the system is symmetric and has a decrease rate of the second order, we characterise this fact and investigate the existence of a best possible rate in the class of piecewise constant controls. The problem turns out to be purely algebraic and depends on the eigenvalues of matrices constructed from a basis matrix whose elements are the second order Lie derivatives of at with respect to the vector fields of the system.
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