The Hartogs extension phenomenon and open embeddings, proper maps, compactifications, cohomologies

Abstract: We use classical homological algebra methods to get results on the Hartogs extension phenomenon for holomorphic sections of holomorphic vector bundles over complex analytic varieties. Namely, we study behaviours of the Hartogs extension property with respect to the open embeddings, proper maps, compactifications, and relations with the compact supports first cohomology and with properties of boundaries of complex analytic varieties. As an application, we get a convex-geometric criterion of the Hartogs phenomenon for complex almost homogeneous algebraic $G$-varieties, where $G$ is a semiabelian variety.