On Resolving Singularities
Abstract
Let V be an irreducible affine algebraic variety over a field k of characteristic zero, and let (f0,...,fm) be a sequence of elements of the coordinate ring. There is probably no elementary condition on the fi and their derivatives which determines whether the blowup of V along (f0,...,fm) is nonsingular. The result is that there indeed is such an elementary condition, involving the first and second derivatives of the fi, provided we admit certain singular blowups, all of which can be resolved by an additional Nash blowup. There is is a particular explicit sequence of ideals R=J0, J1, J2,... ⊂ R so that Vi=BlJiV is the i'th Nash blowup of V, with Ji|Ji+1 for all i. Applying our earlier paper, Vi is nonsingular if and only if the ideal class of Ji+1 divides some power of the ideal class of Ji. The present paper brings things down to earth considerably: such a divisibility of ideal classes implies that for some N r+2 JiN-r-2Ji+1r+3=JiNJi+2. Yet note that this identity in turn implies Ji+2 is a divisor of some power of Ji+1. Thus although Vi may fail to be nonsingular, when the identity holds the next variety Vi+1 must be nonsingular. Thus the Nash question is equivalent to the assertion that the identity above holds for some sufficiently large i and N.
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