Global Newlander-Nirenberg theorem on domains with finite smooth boundary in complex manifolds
Abstract
Let M be a relatively compact C2 domain in a complex manifold M of dimension n. Assume that H1(M,)=0 where is the sheaf of germs of holomorphic tangent fields of M. Suppose that the Levi-form of the boundary of M has at least 3 negative eigenvalues or at least n-1 positive eigenvalues pointwise. We first construct a homotopy formula for -valued (0,1)-forms on M. We then apply a Nash-Moser iteration scheme to show that if a formally integrable almost complex structure of the H\"older-Zygmund class r on M is sufficiently close to the complex structure on M in the H\"older-Zygmund norm r0( M) for some r0>5/2, then there is a diffeomorphism F from M into M that transforms the almost complex structure into the complex structure on F(M), where F ∈ s(M) for all s<r+1/2.
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