The Smale Conjecture and Minimal Legendrian Graph in S2× S3
Abstract
In this article, we recapture the Smale conjecture on a Sasakian 3-sphere via the Legendrian mean curvature flow. More precisely,~we deform the area-preserving contactomorphism (symplectomorphism) of Sasakian 3-spheres to an isometry via the Legendrian mean curvature flow on the Legendrian graph in S2× S3. By using the monotonicity formula and blow-up analysis, we obtain the minimal Legendrian graph in S2× S3. Finally, we will address the rigidity theorem of 2-dimensional Legendrian self-shrinkers in R5. We are able to reconstruct the Harvey-Lawson special Lagrangian cone in C3 from this Legendrian self-shrinker. The partial classification is also provided if the squared norm of the second fundamental form is constant.
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