Harris, Adam; Kolar, Martin

Author(s)

Harris, Adam

Kolar, Martin

Publication Date

2011

Abstract

This article follows recent work of Miyajima on the complex-analytic approach to deformations of the regular part (i.e. the punctured smooth neighbourhood) of isolated singularities. Attention has previously focused on stably-embeddable infinitesimal deformations as those which correspond to standard algebraic deformations of the germ of a variety, and which also lead to convergent series solutions of the Kodaira-Spencer integrability equation. The emphasis of the present paper, however, is on the subspaces Zₒ of first cohomology classes containing infinitesimal deformations with vanishing Kodaira-Spencer bracket, and Wₒ, consisting more broadly of deformations for which the bracket represents the trivial second cohomology class. Deformations representing classes in Zₒ are automatically integrable, regardless of their analytic behaviour near the singular point. Classes in Wₒ are those for which only the first formal obstruction to integrability is overcome. After some preliminary results on cohomology, the main theorem of this paper gives a partial description of the analytic geometry of Zₒ and Wₒ for affine cones of arbitrary dimension.

Citation

Kyushu Journal of Mathematics, 65(1), p. 25-38

ISSN

1340-6116

Link

https://hdl.handle.net/1959.11/9555

Publisher

Kyushu University

Title

On Infinitesimal Deformations of the Regular Part of a Complex Cone Singularity

Type of document

Journal Article

Entity Type

Publication

Author(s)	Harris, Adam Kolar, Martin
Publication Date	2011
Abstract	This article follows recent work of Miyajima on the complex-analytic approach to deformations of the regular part (i.e. the punctured smooth neighbourhood) of isolated singularities. Attention has previously focused on stably-embeddable infinitesimal deformations as those which correspond to standard algebraic deformations of the germ of a variety, and which also lead to convergent series solutions of the Kodaira-Spencer integrability equation. The emphasis of the present paper, however, is on the subspaces Zₒ of first cohomology classes containing infinitesimal deformations with vanishing Kodaira-Spencer bracket, and Wₒ, consisting more broadly of deformations for which the bracket represents the trivial second cohomology class. Deformations representing classes in Zₒ are automatically integrable, regardless of their analytic behaviour near the singular point. Classes in Wₒ are those for which only the first formal obstruction to integrability is overcome. After some preliminary results on cohomology, the main theorem of this paper gives a partial description of the analytic geometry of Zₒ and Wₒ for affine cones of arbitrary dimension.
Citation	Kyushu Journal of Mathematics, 65(1), p. 25-38
ISSN	1340-6116
Link	https://hdl.handle.net/1959.11/9555
Publisher	Kyushu University
Title	On Infinitesimal Deformations of the Regular Part of a Complex Cone Singularity
Type of document	Journal Article
Entity Type	Publication

On Infinitesimal Deformations of the Regular Part of a Complex Cone Singularity

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