English

The distance function from the boundary in a Minkowski space

Analysis of PDEs 2019-07-25 v1

Abstract

Let the space Rn\mathbb{R}^n be endowed with a Minkowski structure MM (that is M ⁣:Rn[0,+)M\colon \mathbb{R}^n \to [0,+\infty) is the gauge function of a compact convex set having the origin as an interior point, and with boundary of class C2C^2), and let dM(x,y)d^M(x,y) be the (asymmetric) distance associated to MM. Given an open domain ΩRn\Omega\subset\mathbb{R}^n of class C2C^2, let dΩ(x):=inf{dM(x,y);yΩ}d_{\Omega}(x) := \inf\{d^M(x,y); y\in\partial\Omega\} be the Minkowski distance of a point xΩx\in\Omega from the boundary of Ω\Omega. We prove that a suitable extension of dΩd_{\Omega} to Rn\mathbb{R}^n (which plays the r\"ole of a signed Minkowski distance to Ω\partial \Omega) is of class C2C^2 in a tubular neighborhood of Ω\partial \Omega, and that dΩd_{\Omega} is of class C2C^2 outside the cut locus of Ω\partial\Omega (that is the closure of the set of points of non--differentiability of dΩd_{\Omega} in Ω\Omega). In addition, we prove that the cut locus of Ω\partial \Omega has Lebesgue measure zero, and that Ω\Omega can be decomposed, up to this set of vanishing measure, into geodesics starting from Ω\partial\Omega and going into Ω\Omega along the normal direction (with respect to the Minkowski distance). We compute explicitly the Jacobian determinant of the change of variables that associates to every point xΩx\in \Omega outside the cut locus the pair (p(x),dΩ(x))(p(x), d_{\Omega}(x)), where p(x)p(x) denotes the (unique) projection of xx on Ω\partial\Omega, and we apply these techniques to the analysis of PDEs of Monge-Kantorovich type arising from problems in optimal transportation theory and shape optimization.

Keywords

Cite

@article{arxiv.math/0612226,
  title  = {The distance function from the boundary in a Minkowski space},
  author = {G. Crasta and A. Malusa},
  journal= {arXiv preprint arXiv:math/0612226},
  year   = {2019}
}

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34 pages