Riemann-Roch theorem: Difference between revisions
Jump to navigation
Jump to search
imported>David Lehavi No edit summary |
imported>David Lehavi m (typo correction) |
||
Line 12: | Line 12: | ||
Using modern tools, the theorem is an immediate consequence of [[Serre's duality]]. | Using modern tools, the theorem is an immediate consequence of [[Serre's duality]]. | ||
[[Category:Mathematics | [[Category:Mathematics Workgroup]] | ||
[[Category:CZ Live]] | [[Category:CZ Live]] |
Revision as of 00:12, 16 February 2007
In algebraic geometry the Riemann-Roch theorem states that if is a smooth algebraic curve, and is an invertible sheaf on then the the following properties hold:
- The Euler characteristic of is given by
- There is a canonical isomorphism
Generalizations
- Riemann-Roch for surfaces and Noether's formula
- Hirzebruch-Riemann-Roch theorem
- Grothendieck-Riemann-Roch theorem
- Atiya-Singer index theorem
Proofs
Using modern tools, the theorem is an immediate consequence of Serre's duality.