IMPULSIVE CONTROL-SYSTEMS WITH COMMUTATIVE VECTOR-FIELDS

We consider variational problems with control laws given by systems of ordinary differential equations whose vector fields depend linearly on the time derivative upsilon = (u1, ..., u(m)) of the control u = (u1, ..., u(m)). The presence of the derivative u, which is motivated by recent applications in Lagrangian mechanics, causes an impulsive dynamics: at any jump of the control, one expects a jump of the state. The main assumption of this paper is the commutativity of the vector fields that multiply the u-alpha. This hypothesis allows us to associate our impulsive systems and the corresponding adjoint systems to suitable nonimpulsive control systems, to which standard techniques can be applied. In particular, we prove a maximum principle, which extends Pontryagin's maximum principle to impulsive commutative systems.