In mathematics, in the field of complex geometry, a holomorphic curve in a complex manifold M is a non-constant holomorphic map f from the complex plane to M.[1]
Nevanlinna theory addresses the question of the distribution of values of a holomorphic curve in the complex projective line.[1][2]
YouTube Encyclopedic
-
1/3Views:71163128 643
-
Space of holomorphic curves (1/4) - Eleny Ionel at IAS
-
John Pardon: Virtual fundamental cycles and contact homology
-
Mod-01 Lec-01 The Idea of a Riemann Surface
Transcription
See also
Notes
- ^ a b Shiffman (1977), p.553
- ^ Min Ru (2001). Nevanlinna Theory and its Relation to Diophantine Approximation. World Scientific. ISBN 981-02-4402-9.
References
- Shiffman, B. (1977). "Holomorphic curves in algebraic manifolds" (PDF). Bulletin of the American Mathematical Society. 83 (4): 553–568. doi:10.1090/s0002-9904-1977-14323-1.
 | This mathematical analysis–related article is a stub. You can help Wikipedia by expanding it. |
This page was last edited on 10 February 2022, at 15:01