The Deformation of Lagrangian Minimal Surfaces in Kahler-Einstein Surfaces
Abstract
Let (N,g0) be a Kahler-Einstein surface with the first Chern class negative and assume that there exists a branched Lagrangian minimal surfaces with respect to the metric g0. We show that when the Kahler-Einstein metric is changed in the same component (i.e. the complex structure is changed), the Lagrangian minimal surface can be deformed accordingly. To get the result, we first obtain a theorem on the deformation of the branched minimal surfaces in a complete Riemannian n-manifold and also generalize a result of J. Chen and G. Tian on the limit of adjunction numbers.
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