Area-minimizing properties of Pansu spheres in the sub-riemannian $3$-sphere
Abstract: We consider the sub-Riemannian $3$-sphere $(\mathbb{S}3,g_h)$ obtained by restriction of the Riemannian metric of constant curvature $1$ to the planar distribution orthogonal to the vertical Hopf vector field. It is known that $(\mathbb{S}3,g_h)$ contains a family of spherical surfaces ${\mathcal{S}\lambda}{\lambda\geq 0}$ with constant mean curvature $\lambda$. In this work we first prove that the two closed half-spheres of $\mathcal{S}0$ with boundary $C_0={0}\times\mathbb{S}1$ minimize the sub-Riemannian area among compact $C1$ surfaces with the same boundary. We also see that the only $C2$ solutions to this Plateau problem are vertical translations of such half-spheres. Second, we establish that the closed $3$-ball enclosed by a sphere $\mathcal{S}\lambda$ with $\lambda>0$ uniquely solves the isoperimetric problem in $(\mathbb{S}3,g_h)$ for $C1$ sets inside a vertical solid tube and containing a horizontal section of the tube. The proofs mainly rely on calibration arguments.
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