New characterizations of the Clifford torus as a Lagrangian self-shrinker
Abstract
In this paper, we obtain several new characterizations of the Clifford torus as a Lagrangian self-shrinker. We first show that the Clifford torus S1(1)×S1(1) is the unique compact orientable Lagrangian self-shrinker in C2 with |A|2≤ 2, which gives an affirmative answer to Castro-Lerma's conjecture. We also prove that the Clifford torus is the unique compact orientable embedded Lagrangian self-shrinker with nonnegative or nonpositive Gauss curvature in C2.
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