Divisorial Extractions from Singular Curves in Smooth 3-Folds, I
Abstract
Consider a singular curve contained in a smooth 3-fold X. Assuming the general elephant conjecture, the general hypersurface section ⊂ S⊂ X is Du Val. Under that assumption, this paper describes the construction of a divisorial extraction from by Kustin--Miller unprojection. Terminal extractions from ⊂ X are proved not to exist if S is of type D2k, E7 or E8 and are classified if S is of type A1,A2 or E6. The An and D2k+1 cases shall be considered in a further paper.
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