Metric properties of classes of Hölder surfaces on Carnot groups (Q2399508)

Let \(\mathbb{G}, \widetilde{\mathbb{G}}\) be two nilpotent graded Lie groups, \(\Omega \subset \mathbb{G}\) an open set, and \(\varphi : \Omega \to \widetilde{\mathbb{G}}\) a mapping. Under certain Hölder-type regularity assumptions on \(\varphi\) (less than Lipschitz), the author defines an intrinsic measure on the image \(\varphi(\Omega)\) or on the graph of \(\varphi\) (as a subset of a larger group \(\mathbb{U}\) in which \(\mathbb{G}, \widetilde{\mathbb{G}}\) are ``orthogonally'' embedded). The main result announced in this paper gives a change-of-variables formula to transform the Hausdorff measure on \(\Omega \subset \mathbb{G}\) into the intrinsic measure. A few examples are given in which the codomain \(\widetilde{\mathbb{G}}\) is a Carnot group of step two.