English

An Affine Invariant Minkowski Problem

Differential Geometry 2026-05-06 v1

Abstract

In Euclidean space, the generalised Minkowski problem asks, for a given finite Radon measure μ\mu on the unit sphere Sd\mathbb{S}^d, to find a compact convex set KK with area measure μ\mu. For convex sets in the Minkowski space invariant under an affine deformation of a uniform lattice of SO0(d,1)\mathrm{SO}_0(d,1), the analogous Minkowski problem was considered and solved by Barbot--B\'eguin--Zeghib (partially) and Bonsante--Fillastre. By a theorem of Mess--Barbot--Bonsante, that also solves the Minkowski problem in flat Lorentzian spacetimes with compact hyperbolic Cauchy surface. We consider convex domains of the oriented real affine space Rd+1\mathbb{R}^{d+1} which are invariant under a subgroup of affine transformations obtained by adding translation parts to a discrete subgroup of SL(Rd+1)\mathrm{SL} (\mathbb{R}^{d+1}) dividing a convex cone. We prove that those convex domains satisfy a local Steiner Formula, allowing to introduce natural area measures and define an affine invariant Minkowski problem. We then solve that Minkowski problem through a variational method using the convexity of a covolume functional. We also give an interpretation of those results in some "affine spacetimes", which were introduced by the author in a preceding work.

Keywords

Cite

@article{arxiv.2605.03791,
  title  = {An Affine Invariant Minkowski Problem},
  author = {Antoine Ablondi},
  journal= {arXiv preprint arXiv:2605.03791},
  year   = {2026}
}

Comments

43 pages, 3 figures

R2 v1 2026-07-01T12:50:53.194Z