Geometric/asymptotic properties of adaptive nonlinear systems with partial excitation

In this paper we continue the study of geometric/asymptotic properties of adaptive nonlinear systems. The long-standing question of whether the parameter estimates converge to stabilizing values, stabilizing if used in a nonadaptive controller, is addressed in a general set-point regulation case. The key quantifier of excitation in an adaptive system is the rank r of the regressor matrix at the resulting equilibrium. Our earlier paper showed that, when either r=0 or r=p (where p is the number of uncertain parameters), the set of initial conditions leading to destabilizing estimates is of measure zero. Intuition suggests the same for the intermediate case 0