Geodesic
Algebraic analog of compact complex spaces with a sufficiently large field of meromorphic functions. III
Izvestiya. Mathematics, Tome 3 (1969) no. 3, pp. 477-513 Cet article a éte moissonné depuis la source Math-Net.Ru

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In this part of the paper it is shown that minischemes are obtained from schemes by using inverses of monoidal transformations (the “how Lemma”). Several resolution theorems for minischemes are also proved; in particular: Given a nonsingular minischeme over a field with zero characteristic or a nonsingular three-dimensional minischeme over an algebraically closed field with arbitrary characteristic, it can be made into a projective scheme by means of a suitable sequence of monoidal transformations with nonsingular centers. 
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     author = {B. G. Moishezon},
     title = {Algebraic analog of compact complex spaces with a~sufficiently large field of meromorphic {functions.~III}},
     journal = {Izvestiya. Mathematics},
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     year = {1969},
     volume = {3},
     number = {3},
     language = {en},
     url = {http://geodesic.mathdoc.fr/item/IM2_1969_3_3_a2/}
}
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B. G. Moishezon. Algebraic analog of compact complex spaces with a sufficiently large field of meromorphic functions. III. Izvestiya. Mathematics, Tome 3 (1969) no. 3, pp. 477-513. http://geodesic.mathdoc.fr/item/IM2_1969_3_3_a2/