• Source: Todorov surface

In algebraic geometry, a Todorov surface is one of a class of surfaces of general type introduced by Todorov (1981) for which the conclusion of the Torelli theorem does not hold.




References


Morrison, David R. (1988), "On the moduli of Todorov surfaces", Algebraic geometry and commutative algebra, vol. I, Tokyo: Kinokuniya, pp. 313–355, MR 0977767
Todorov, Andrei N. (1981), "A construction of surfaces with pg = 1, q = 0 and 2 ≤ (K2) ≤ 8. Counterexamples of the global Torelli theorem.", Invent. Math., 63 (2): 287–304, doi:10.1007/BF01393879, MR 0610540

Kata Kunci Pencarian:

• Todorov surface
• List of complex and algebraic surfaces
• Surface of general type
• Floyd Mayweather Jr.
• Bulgarian mafia
• Micellar solubilization
• David Attenborough
• Krukenberg tumor
• Max Martin production discography
• ImmTAC