Open AccessProjectivity of the Space of Divisors on a Normal Compact Complex Space
Author(s) -
Akira Fujiki
Publication year - 1982
Publication title -
publications of the research institute for mathematical sciences
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.786
H-Index - 39
eISSN - 1663-4926
pISSN - 0034-5318
DOI - 10.2977/prims/1195183301
Subject(s) - space (punctuation) , mathematics , homogeneous , pure mathematics , principal (computer security) , algebra over a field , combinatorics , computer science , operating system
For any complex space we shall denote by Dx the Douady space of compact complex subspaces of X [1]. Let ZX^DX x X be the universal subspace so that for each d e Dx, the corresponding subspace of X is given by Zx>d\=Zx n ({d} x X) £={d}xX = X. Recall that a Cartier divisor on X is a complex subspace of X whose sheaf of ideals is generated locally by a single element which is not a zero divisor. Let Div X = {d e Dx; ZXjd is a Cartier divisor on X}. Then Div X is Zariski open in Dx, and in fact is a union of connected components of Dx when X is nonsingular. Then the purpose of this paper is to prove the following:
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