Montel domains and equicontinuity domains
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If X is a reduced Stein space with no isolated points, then we prove that for every O(X)-convex open set D of X there exists a subfamily F of O(X) such that D = B(F) = E(F) = D(F), where B(F), E(F) and D(F) are the Montel domain, the equicontinuity domain and the normality domain of F respectively.
- Mathematics journal of Toyama University
Mathematics journal of Toyama University 26, 25-34, 2003