Embedded constant mean curvature hypertori in the 2n-sphere
Abstract
Brendle proved Lawson conjecture about minimal embedded torus in the round three-dimensional sphere. Carlotto and Schulz constructed a minimal embedded three-dimensional hypertorus in the round four-dimensional sphere and conjectured that their hypertorus is a unique minimal embedded three-dimensional hypertorus in the round four-dimensional sphere. In this paper, we construct two different constant mean curvature embedded (2n-1)-dimensional hypertori (that is, topological type \(Sn-1 × Sn-1 × S1\)) which have the same negative mean curvature \(H\) in the round 2n-dimensional sphere \(S2n(1)\) .
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