Abstract
On the Abelian cover $$({\mathbb {R}}^{2},g)$$ of a class A Lorentzian 2-torus $$({\mathbb {T}}^{2},g)$$ , we showed the existence of global viscosity solutions to the eikonal equation $$\begin{aligned} g(\nabla u,\nabla u)=-1 \end{aligned}$$ associated to those homologies in the interior of the stable time cone. Some other related dynamical properties are also considered. As an application of the main results, we study the differentiability of the unit sphere of the stable time separation associated to the class A Lorentzian 2-torus.
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