A counterexample to Hartogs' type extension of holomorphic line bundles

Abstract

Consider a domain in Cn with n≥slant 2 and a compact subset K⊂ such that K is connected. We address the problem whether a holomorphic line bundle defined on K extends to . In 2013, Forn ss, Sibony and Wold gave a positive answer in dimension n≥slant 3, when is pseudoconvex and K is a sublevel set of a strongly plurisubharmonic exhaustion function. However, for K of general shape, we construct counterexamples in any dimension n≥slant 2. The key is a certain gluing lemma by means of which we extend any two holomorphic line bundles which are isomorphic on the intersection of their base spaces.