Compactness of Fixed Point Maps and the Ball-Marsden-Slemrod Conjecture

Abstract

Given a parameter dependent fixed point equation x = F(x,u), we derive an abstract compactness principle for the fixed point map u x*(u) under the assumptions that (i) the fixed point equation can be solved by the contraction principle and (ii) the map u F(x,u) is compact for fixed x. This result is applied to infinite-dimensional, semi-linear control systems and their reachable sets. More precisely, we extend a non-controllability result of Ball, Marsden, and Slemrod [1] to semi-linear systems. First we consider Lp-controls, p>1. Subsequently we analyze the case p=1.