Non-isoparametric Serrin domains of S3 with connected toric boundary
Abstract
We investigate the overdetermined torsion problem cases - u = 1 & in\ \\ u=0 & on\ ∂ \\ ∂ u∂ =const. & on\ ∂ , cases where is a smooth Riemannian domain. Domains admitting a solution to this problem are called Serrin domains, after the celebrated work of Serrin Se71, where is proved that in Rn such domains are geodesic balls. In the present paper we establish the existence of two distinct types of Serrin domains of S3, respectively of small and large volume, each of whose boundary is connected and is neither isometric to a geodesic sphere nor to a Clifford torus. These domains arise as nontrivial perturbations of some classical symmetric solutions to the same problem. Our approach relies on an implicit construction based on the Crandall-Rabinowitz bifurcation theorem, which allows us to detect branches of non-radial solutions bifurcating from a family of radial ones. The resulting examples highlight new geometric configurations of the torsion problem in the three-dimensional sphere, providing another proof of the fact that the rigidity of Serrin-type results can fail in the presence of curvature.
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