Calculus of Variations and Geometric Measure Theory

E. Le Donne - A. Lerario - L. Nalon - N. Paddeu - L. Rizzi

Sard property for rank 2 polarizations in metabelian Lie groups

created by rizzi1 on 15 Jul 2026

[BibTeX]

preprint

Inserted: 15 jul 2026

Year: 2026

ArXiv: 2607.12530 PDF

Abstract:

We provide bounds on the dimension of the abnormal set for rank 2 polarizations on metabelian Lie groups, establishing the Sard property for the end-point map of such groups. We also obtain bounds for the dimension of the Goh-abnormal set for metabelian Lie groups where the codimension of the derived subgroup is at most 2, with no assumption on the rank of the polarization. We thus infer that these polarized groups, equipped with sub-Riemannian structures, satisfy the minimizing Sard property.