Rigidity and Classification of Legendrian Self-Shrinkers
Abstract: In this article, we first classify Legendrian self-shrinkers in $\mathbb{R}% {3}$ and $\mathbb{R}{5}$. We then proved a Legendrian rigidity theorem, which can be regarded as an analogue of the result of Li-Wang \cite{lw}. More precisely, let $F(\Sigma)\subset\mathbb{R}{5}$ be an orientable Legendrian self-shrinker, if $\Vert A\Vert_{g}{2}\leq2$ and the associated Legendrian immersion $\bar{F}\subset\mathbb{R}{4}\times\mathbb{S}{1}$ is compact, then $\bar{F}$ must be a flat minimal generalized Legendrian Clifford torus in $\mathbb{S}{5}$, whose cone $\mathcal{C}(\bar{F}(\Sigma))$ is the Harvey-Lawson special Lagrangian cone in $\mathbb{C}{3}$.
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