The local Steiness problem with singularities
Abstract
In this article, we prove that if : X→ is an unbranched Riemann domain with Stein of dimension n and a locally q-complete morphism, then X is cohomologically q-complete if n≥ 3 and 1≤ q≤ n-2 or if has dimension 2 and 1≤ q≤ 2. This generalizes a well-known result which is obtained in ~ref3 for q=1 when X and have isolated singularities and, gives in particular a positive answer to the local Steiness problem, namely if X is a Stein space and a locally Stein open subset of X, then is Stein.
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