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Autor principal: Bravo-Gadea, Jorge
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2604.10302
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author Bravo-Gadea, Jorge
author_facet Bravo-Gadea, Jorge
contents We study the relationship between Lorentz harmonic maps into the hyperbolic plane and spacelike surfaces in anti-de Sitter 3-space. Using loop group techniques, we develop a DPW-type representation for Lorentz harmonic maps and provide an explicit solution of the associated Cauchy problem in terms of a pair of potentials. We then establish a correspondence between Lorentz harmonic maps and spacelike immersions in anti-de Sitter space, identifying conditions under which a harmonic map arises as the Gauss map of a surface. In the nondegenerate case, this leads to a one-parameter family of spacelike surfaces of constant Gauss curvature, together with explicit reconstruction formulas. We also analyze the degenerate case, where the Gauss map fails to be an immersion, and show that additional data are required to recover the surface. Finally, we formulate and solve the geometric Cauchy problem for spacelike surfaces of constant curvature in anti-de Sitter space, providing a constructive method to recover surfaces from prescribed initial data. This establishes a direct link between the analytic theory of Lorentz harmonic maps and the geometry of surfaces in Lorentzian space forms.
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institution arXiv
publishDate 2026
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spellingShingle Lorentz harmonic maps into the hyperbolic plane and spacelike surfaces in anti-de Sitter 3-space
Bravo-Gadea, Jorge
Differential Geometry
We study the relationship between Lorentz harmonic maps into the hyperbolic plane and spacelike surfaces in anti-de Sitter 3-space. Using loop group techniques, we develop a DPW-type representation for Lorentz harmonic maps and provide an explicit solution of the associated Cauchy problem in terms of a pair of potentials. We then establish a correspondence between Lorentz harmonic maps and spacelike immersions in anti-de Sitter space, identifying conditions under which a harmonic map arises as the Gauss map of a surface. In the nondegenerate case, this leads to a one-parameter family of spacelike surfaces of constant Gauss curvature, together with explicit reconstruction formulas. We also analyze the degenerate case, where the Gauss map fails to be an immersion, and show that additional data are required to recover the surface. Finally, we formulate and solve the geometric Cauchy problem for spacelike surfaces of constant curvature in anti-de Sitter space, providing a constructive method to recover surfaces from prescribed initial data. This establishes a direct link between the analytic theory of Lorentz harmonic maps and the geometry of surfaces in Lorentzian space forms.
title Lorentz harmonic maps into the hyperbolic plane and spacelike surfaces in anti-de Sitter 3-space
topic Differential Geometry
url https://arxiv.org/abs/2604.10302