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Existence and regularity for prescribed Lorentzian mean curvature hypersurfaces, and the Born-Infeld model

Jaeyoung Byeon, Norihisa Ikoma, Andrea Malchiodi, Luciano Mari

Abstract

Given a measure $ρ$ on a domain $Ω\subset \mathbb{R}^m$, we study spacelike graphs over $Ω$ in Minkowski space with Lorentzian mean curvature $ρ$ and Dirichlet boundary condition on $\partial Ω$. The graph function $u_ρ: Ω\rightarrow \mathbb{R}$ also represents the electric potential generated by a charge $ρ$ in electrostatic Born-Infeld theory. While $u_ρ$ minimizes the action $$ I_ρ(ψ) = \int_Ω \Big( 1 - \sqrt{1-|Dψ|^2} \Big) \mathrm{d} x - \langle ρ, ψ\rangle $$ among competitors with $|Dψ| \le 1$, because of a lack of smoothness of the Lagrangian density when $|Dψ| = 1$ a direct approach via minimization may not produce a solution to the Euler-Lagrange equation (BI). In this paper, we study existence and regularity of $u_ρ$ for general $ρ$, in a bounded domain and in the entire $\mathbb{R}^m$. In particular, we find sufficient conditions to guarantee that $u_ρ$ solves (BI) and enjoys log-improved $W^{2,2}_{\mathrm{loc}}$ estimates, and we construct examples helping to identify sharp thresholds for the regularity of $ρ$ to ensure the validity of (BI). One of the main difficulties is the possible presence of light segments in the graph of $u_ρ$, which will be discussed in detail.

Existence and regularity for prescribed Lorentzian mean curvature hypersurfaces, and the Born-Infeld model

Abstract

Given a measure on a domain , we study spacelike graphs over in Minkowski space with Lorentzian mean curvature and Dirichlet boundary condition on . The graph function also represents the electric potential generated by a charge in electrostatic Born-Infeld theory. While minimizes the action among competitors with , because of a lack of smoothness of the Lagrangian density when a direct approach via minimization may not produce a solution to the Euler-Lagrange equation (BI). In this paper, we study existence and regularity of for general , in a bounded domain and in the entire . In particular, we find sufficient conditions to guarantee that solves (BI) and enjoys log-improved estimates, and we construct examples helping to identify sharp thresholds for the regularity of to ensure the validity of (BI). One of the main difficulties is the possible presence of light segments in the graph of , which will be discussed in detail.
Paper Structure (26 sections, 32 theorems, 371 equations)

This paper contains 26 sections, 32 theorems, 371 equations.

Key Result

Theorem 1.3

Let $\Omega \subset \mathbb R^m$ be a bounded domain, and let $\phi \in C(\partial \Omega)$. The following properties are equivalent:

Theorems & Definitions (86)

  • Remark 1.1
  • Definition 1.2
  • Theorem 1.3: bartniksimon
  • Remark 1.4
  • Remark 1.5
  • Theorem 1.6: KM95
  • Theorem 1.7
  • Remark 1.8
  • Theorem 1.9
  • Corollary 1.10
  • ...and 76 more