Purely unrectifiable metric spaces and perturbations of Lipschitz functions

Abstract

We characterise purely n-unrectifiable subsets S of a complete metric space X with finite Hausdorff n-measure by studying arbitrarily small perturbations of elements of the set of all bounded 1-Lipschitz functions f X Rm with respect to the supremum norm. In one such characterisation it is shown that, if S has positive lower density almost everywhere, then the set of all f with Hn(f(S))=0 is residual. Conversely, if E⊂ X is n-rectifiable with Hn(E)>0, the set of all f with Hn(f(E))>0 is residual. These results provide a replacement for the Besicovitch-Federer projection theorem in arbitrary metric spaces, which is known to be false outside of Euclidean spaces.