New verifiable stationarity concepts for a class of mathematical programs with disjunctive constraints

Abstract

In this paper we consider a sufficiently broad class of nonlinear mathematical programs with disjunctive constraints, which, e.g., include mathematical programs with complemetarity/vanishing constraints. We present an extension of the concept of Q-stationarity as introduced in the recent paper [2]. Q-stationarity can be easily combined with the well-known notion of M-stationarity to obtain the stronger property of so-called QM-stationarity. We show how the property of QM-stationarity (and thus also of M-stationarity) can be efficiently verified for the considered problem class by computing Q-stationary solutions of a certain quadratic program. We consider further the situation that the point which is to be tested for QM-stationarity, is not known exactly, but is approximated by some convergent sequence, as it is usually the case when applying some numerical method.