Spherical Ricci tori with rotational symmetry
Abstract
In this article, we study c-spherical Ricci metrics, that is, Riemannian metrics whose Gaussian curvature K satisfies equation* (K - c) K - |∇ K|2 - 4K(K - c)2 = 0, equation* for some c>0. We explicitly construct a two-parameter family of such metrics with rotational symmetry and show that infinitely many non-isometric examples can be realized on the same torus. Moreover, we investigate their realization as induced metrics on compact rotational surfaces in S3, establishing the existence of embedded compact spherical Ricci surfaces by controlling a period function associated with the isometric immersion.
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