# SURFACES OF CLASS VII0 AND AFFINE GEOMETRY

@inproceedings{Bogomolov1983SURFACESOC, title={SURFACES OF CLASS VII0 AND AFFINE GEOMETRY}, author={Fedor A. Bogomolov}, year={1983} }

This paper gives a complete and detailed proof of the theorem to the effect that the only surfaces of class VII0 with b2=0 are the Inoue-Kodaira surfaces. Besides that, it contains several results on manifolds with affine structures whose holonomy groups are commutative; in particular, the general case is reduced to the case when the holonomy group is diagonal. Bibliography: 16 titles.

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## Non-Kähler Calabi-Yau manifolds

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## Review of geometry and analysis

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## A Brief History of Kähler Geometry

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## Non-K\"ahler Calabi-Yau manifolds

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## The Chern-Ricci flow on primary Hopf surfaces

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## The Yamabe invariant of Inoue surfaces and their blowups

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## Inoue surfaces and the Chern–Ricci flow

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