Quantitative C1-stability of spheres in rank one symmetric spaces of non-compact type

Abstract

We prove that in any rank one symmetric space of non-compact type M∈\R Hn,C Hm,H Hm,O H2\, geodesic spheres are uniformly quantitatively stable with respect to small C1-volume preserving perturbations. We quantify the gain of perimeter in terms of the W1,2-norm of the perturbation, taking advantage of the explicit spectral gap of the Laplacian on geodesic spheres in M. As a consequence, we give a quantitative proof that for small volumes, geodesic spheres are isoperimetric regions among all sets of finite perimeter.