Integrability of Koszul connections on complex vector bundles over domains in Cn
Abstract
We study invertible matrix solutions A to the equation A-1∂ A=ω(0,1) on a small open subset U of the closure M of a domain M⊂ Cn, where ω(0,1) is a matrix of (0,1) forms on M satisfying the formal integrable condition ∂ω(0,1)=ω(0,1)ω(0,1). For a C2 domain M that is either strongly pseudoconvex or has at least 3 negative Levi eigenvalues at a boundary point contained in U, we obtain existence and sharp regularity of the solutions.
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