On q-complete and q-concave with corners complex manifolds

Abstract

It is proved that if there exists a positive and continuous function f on an n-dimensional complex manifold X, q-convex with corners outside a compact set K⊂ X and which exhausts X from below, then dimCHp(X,F)<+∞ for any coherent analytic sheaf F on X if p<n-q. It is known from the theory of Andreotti and Grauert that if a complex space X is q-complete, then X is cohomoloogically q-complete. Until now it is not known in general if these two conditions are equivalent. The aim of section 4 of this article is to provide a counterexample to the conjecture posed by Andreotti and Grauert ~ref2 to show that a cohomologically q-complete space is not necessarily q-complete. In section 5 of this article, we will prove that there exist for each pair of integers (n,q) with 2≤ q≤ n-1 a q-complete with corners open subset D of Pn and F∈ coh(Pn) such that D is not cohomologically q-complete with respect to F. Here q=n-[n-1q], where [x] denotes the integral part of x.