Partial immersions and partially free maps

Abstract

In a recent paper~DDL10 we studied basic properties of partial immersions and partially free maps, a generalization of free maps introduced first by Gromov in~Gro70. In this short note we show how to build partially free maps out of partial immersions and use this fact to prove that the partially free maps in critical dimension introduced in Theorems 1.1-1.3 of~DDL10 for three important types of distributions can actually be built out of partial immersions. Finally, we show that the canonical contact structure on 2n+1 admits partial immersions in critical dimension for every n.