On Willmore Legendrian surfaces in S5 and the contact stationary Legendrian Willmore surfaces

Abstract

In this paper we study Willmore Legendrian surfaces (that is Legendrian surfaces which are critical points of the Willmore functional). We use an equality proved in Luo to get a relation between Willmore Legendrian surfaces and contact stationary Legendrian surfaces in S5, and then we use this relation to prove a classification result for Willmore Legendrian spheres in S5. We also get an integral inequality for Willmore Legendrian surfaces and in particular we prove that if the square length of the second fundamental form of a Willmore Legendrian surface in S5 belongs to [0,2], then it must either be 0 and L is totally geodesic or 2 and L is a flat minimal Legendrian tori, which generalizes a result of YKM. We also study variation of the Willmore functional among Legendrian surfaces in 5-dimensional Sasakian manifolds. Let be a closed surface and (M,α,gα,J) a 5-dimensional Sasakian manifold with a contact form α, an associated metric gα and an almost complex structure J. Assume that f: M is a Legendrian immersion. Then f is called a contact stationary Legendrian Willmore surface (in short, a csL Willmore surface) if it is a critical point of the Willmore functional under contact deformations. To investigate the existence of csL Willmore surfaces we introduce a higher order flow which preserves the Legendre condition and decreases the Willmore energy. As a first step we prove that this flow is well posed if (M,α,gα,J) is a Sasakian Einstein manifold, in particular S5.