Olav Arnfinn Laudal, Gerhard Pfister (auth.)9780387192352, 0-387-19235-2, 3540192352
This research monograph sets out to study the notion of a local moduli suite of algebraic objects like e.g. schemes, singularities or Lie algebras and provides a framework for this. The basic idea is to work with the action of the kernel of the Kodaira-Spencer map, on the base space of a versal family. The main results are the existence, in a general context, of a local moduli suite in the category of algebraic spaces, and the proof that, generically, this moduli suite is the quotient of a canonical filtration of the base space of the versal family by the action of the Kodaira-Spencer kernel. Applied to the special case of quasihomogenous hypersurfaces, these ideas provide the framework for the proof of the existence of a coarse moduli scheme for plane curve singularities with fixed semigroup and minimal Tjurina number . An example shows that for arbitrary the corresponding moduli space is not, in general, a scheme. The book addresses mathematicians working on problems of moduli, in algebraic or in complex analytic geometry. It assumes a working knowledge of deformation theory. |
Table of contents :
Introduction….Pages 1-7
The prorepresenting substratum of the formal moduli….Pages 8-14
Automorphisms of the formal moduli….Pages 15-31
The kodaira-spencer map and its kernel….Pages 32-60
Applications to isolated hypersurface singularities….Pages 61-71
Plane curve singularities with k*-action….Pages 72-87
The generic component of the local moduli suite….Pages 88-104
The moduli suite of x 1 5 +x 2 11 ….Pages 105-111 |
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