Controller Synthesis for Discrete-Time Polynomial Systems via Occupation Measures

Abstract: In this paper, we design nonlinear state feedback controllers for discrete-time polynomial dynamical systems via the occupation measure approach. We propose the discrete-time controlled Liouville equation, and use it to formulate the controller synthesis problem as an infinite-dimensional linear programming problem on measures, which is then relaxed as finitedimensional semidefinite programming problems on moments of measures and their duals on sums-of-squares polynomials. Nonlinear controllers can be extracte… Show more

“…In this case, the matrix X 1,T contains the derivatives of the states at the sampling times when the measurements are taken (see [6,Remark 2]). In this paper, we will focus on continuous-time polynomial systems because this allows us to adopt the tools from [7], [10], [11], while for discrete-time polynomial systems less results are available [12], [13].…”

Learning control for polynomial systems using sum of squares relaxations

“…In this case, the matrix X 1,T contains the derivatives of the states at the sampling times when the measurements are taken (see [6,Remark 2]). In this paper, we will focus on continuous-time polynomial systems because this allows us to adopt the tools from [7], [10], [11], while for discrete-time polynomial systems less results are available [12], [13].…”

Learning control for polynomial systems using sum of squares relaxations

“…In this case, the matrix X 1,T contains the derivatives of the states at the sampling times when the measurements are taken (see [6,Remark 2]). In this paper we will focus on continuous-time polynomial systems because this allows us to adopt the tools from [7], [11], [12] for this class of systems, while for discrete-time polynomial systems less results are available [13], [14].…”

Learning control for polynomial systems using sum of squares relaxations

“…The procedure of extracting a controller for mode i from the moments of the measure ν i is the same as in Section IV.C. of [48].…”

“…In this example, we linearize the dynamics and work with the PWA system as in [22]. (We could have approximated the system with higher order polynomials, synthesized the controller, and run on the real system as in Example E in [48], but we are more interested in the comparison with the traditional model predictive control (MPC) approach. )…”

Controller Synthesis for Discrete-time Hybrid Polynomial Systems via Occupation Measures