Algebraic surface: Difference between revisions
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An '''algebraic surface''' over a [[field]] <math>K</math> is a two dimensional algebraic variety over this field. | An '''algebraic surface''' over a [[field]] <math>K</math> is a two dimensional algebraic variety over this field. | ||
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=== Invariants === | === Invariants === | ||
* classical invariants | * classical invariants | ||
* the | * the [[Kodaira dimension]] | ||
=== The Picard group and intersection theory === | === The Picard group and intersection theory === | ||
* intersection product | * intersection product | ||
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*A. Beauville ''Complex algebraic surfaces'' ISBN 0521498422 | *A. Beauville ''Complex algebraic surfaces'' ISBN 0521498422 | ||
*E. Bombieri and D. Mumford ''Enriques' classification of surfaces in char. <math>p</math>''; part I in ''Global analysis'', Princeton university press. Part II in ''complex analysis and algebraic geometry'', Cambridge university press. Part III in ''Invent Math''. 35. | *E. Bombieri and D. Mumford ''Enriques' classification of surfaces in char. <math>p</math>''; part I in ''Global analysis'', Princeton university press. Part II in ''complex analysis and algebraic geometry'', Cambridge university press. Part III in ''Invent Math''. 35. | ||
*P. Griffithis and J. Harris ''Principles of Algebraic Geometry''. Chapter 4 | *P. Griffithis and J. Harris ''Principles of Algebraic Geometry''. Chapter 4[[Category:Suggestion Bot Tag]] | ||
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Latest revision as of 11:01, 8 July 2024
An algebraic surface over a field is a two dimensional algebraic variety over this field.
Examples
Classification
Invariants
- classical invariants
- the Kodaira dimension
The Picard group and intersection theory
- intersection product
- various forms of Riemann Roch
- kodaira dimension
Negative Kodaira dimension
Kodaira dimension 0
Kodaira dimension 1
General type
Positive characteristics
References
- W. Barth, C. Peters, and A. Van de Ven Compact Complex Surfaces
- A. Beauville Complex algebraic surfaces ISBN 0521498422
- E. Bombieri and D. Mumford Enriques' classification of surfaces in char. ; part I in Global analysis, Princeton university press. Part II in complex analysis and algebraic geometry, Cambridge university press. Part III in Invent Math. 35.
- P. Griffithis and J. Harris Principles of Algebraic Geometry. Chapter 4
