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We prove that a bounded domain in Cⁿ admitting a complete K\"ahler metric with negatively pinched holomorphic bisectional curvature near the boundary, admits a complete K\"ahler metric with negatively pinched holomorphic bisectional curvature everywhere. As a consequence we prove that strictly pseudoconvex bounded domains with C² boundary and bounded domains with squeezing function tending to 1 at every point of the boundary, admit a complete K\"ahler metric with negatively pinched holomorphic bisectional curvature everywhere.
Omar Bakkacha (Sun,) studied this question.
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