Homological dimensions of modules of holomorphic functions on submanifolds of Stein manifolds

摘要

Let X be a Stein manifold, and let Y C X be a closed complex submanifold. Denote by б(X) the algebra of holomorphic functions on X. We show that the weak (i.e., flat) homological dimension of б(Y) as a Fréchet б(X)-module equals the codimension of Y in X. In the case where X and Y are of Liouville type, the same formula is proved for the projective homological dimension of over б(X). On the other hand, we show that if X is of Liouville type and Y is hyperconvex, then the projective homological dimension of б(Y) over б(X) equals the dimension of X.