Long time existence of the symplectic mean curvature flow
Abstract
Let (M,g) be a K\"ahler surface with a constant holomorphic sectional curvature k>0, and an immersed symplectic surface in M. Suppose evolves along the mean curvature flow in M. In this paper, we show that the symplectic mean curvature flow exists for long time and converges to a holomorphic curve if the initial surface satisfies |A|2≤ 2/3|H|2+1/2 k and α≥ 306 or |A|2≤ 2/3 |H|2+4/5 kα and α251/265.
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