Some conformally invariant gap theorems for Bach-flat 4-manifolds
Abstract
Around 2007, A. Chang, J. Qing, and P. Yang proved a conformal gap theorem for Bach-flat metrics with round sphere as the model case. In this article, we extend this result to prove conformally invariant gap theorems for Bach-flat 4-manifolds with (CP2, gFS) and (S2×S2,gprod) as model cases. An iteration argument plays an important role in the case of (CP2, gFS) and the convergence theory of Bach-flat metrics is of particular importance in the case of (S2×S2,gprod).
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