A Sum-of-Squares-Based Procedure to Approximate the Pontryagin Difference of Semialgebraic Sets

Abstract

The P-difference between two sets A and B is the set of all points, C, such that the addition of B to any of the points in C is contained in A. Such a set difference plays an important role in robust model predictive control and in set-theoretic control. In the paper we demonstrate that an inner approximation of the P-difference between two semialgebraic sets can be computed using the Sums of Squares Programming, and we illustrate the procedure using several computational examples.