Murphy's law in algebraic geometry: Badly-behaved deformation spaces
成果类型:
Article
署名作者:
Vakil, R
署名单位:
Stanford University
刊物名称:
INVENTIONES MATHEMATICAE
ISSN/ISSBN:
0020-9910
DOI:
10.1007/s00222-005-0481-9
发表日期:
2006
页码:
569-590
关键词:
hilbert scheme
MODULI SPACES
plane-curves
general type
SURFACES
VARIETIES
摘要:
We consider the question: How bad can the deformation space of an object be? The answer seems to be: Unless there is some a priori reason otherwise, the deformation space may be as bad as possible. We show this for a number of important moduli spaces. More precisely, every singularity of finite type over Zeta (up to smooth parameters) appears on: the Hilbert scheme of curves in projective space; and the moduli spaces of smooth projective general-type surfaces (or higher-dimensional varieties), plane curves with nodes and cusps, stable sheaves, isolated threefold singularities, and more. The objects themselves are not pathological, and are in fact as nice as can be: the curves are smooth, the surfaces are automorphism-free and have very ample canonical bundle, the stable sheaves are torsion-free of rank 1, the singularities are normal and Cohen-Macaulay, etc. This justifies Mumford's philosophy that even moduli spaces of well-behaved objects should be arbitrarily bad unless there is an a priori reason otherwise. Thus one can construct a smooth curve in projective space whose deformation space has any given number of components, each with any given singularity type, with any given non-reduced behavior. Similarly one can give a surface over F-p that lifts to Z/p(7) but not Z/p(8). ( Of course the results hold in the holomorphic category as well.) It is usually difficult to compute deformation spaces directly from obstruction theories. We circumvent this by relating them to more tractable deformation spaces via smooth morphisms. The essential starting point is Mnev's universality theorem.
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