On the uniqueness of certain families of holomorphic disks
Date
2011
Authors
Rochon, Frédéric
Journal Title
Journal ISSN
Volume Title
Publisher
American Mathematical Society
Abstract
A Zoll metric is a Riemannian metric whose geodesics are all circles
of equal length. Via the twistor correspondence of LeBrun and Mason, a
Zoll metric on the sphere S² corresponds to a family of holomorphic disks in
CP₂ with boundary in a totally real submanifold P ⊂ CP₂. In this paper, we
show that for a fixed P ⊂ CP₂, such a family is unique if it exists, implying
that the twistor correspondence of LeBrun and Mason is injective. One of the
key ingredients in the proof is the blow-up and blow-down constructions in the
sense of Melrose.
Description
Keywords
Citation
Collections
Source
Transactions of the American Mathematical Society
Type
Journal article