An optimal gap theorem
Abstract
By solving the Cauchy problem for the Hodge-Laplace heat equation for d-closed, positive (1, 1)-forms, we prove an optimal gap theorem for K\"ahler manifolds with nonnegative bisectional curvature which asserts that the manifold is flat if the average of the scalar curvature over balls of radius r centered at any fixed point o is a function of o(r-2). Furthermore via a relative monotonicity estimate we obtain a stronger statement, namely a `positive mass' type result, asserting that if (M, g) is not flat, then r ∞ r2Vo(r)∫Bo(r)S(y)\, dμ(y)>0 for any o∈ M.
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