Quasi Differential Quotients

Abstract

We explore basic properties and some applications of Quasi Differential Quotients (QDQs) and the related QDQ-approximating multi-cones. A QDQ, which is a special kind of H.Sussmann's Approximate Generalized Differential Quotient (AGDQ), consists in a notion of generalized differentiation for set-valued maps. QDQs have the advantage over AGDQs of allowing a genuine, non-punctured, Open Mapping result, so implying stronger set-separation theorems. They have already proved quite useful in the investigation of some connections occurring between infimum gap phenomena and the normality of minima. Moreover, QDQ-approximating multi-cones are fit in optimal control to deduce Maximum Principles that involve (set-valued) Lie brackets of nonsmooth vector fields.