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Symplectic geometry of orbifolds and Diophantine equations
오비다양체의 사교기하와 디오판투스 방정식

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Authors
신형석
Advisor
조철현
Major
자연과학대학 수리과학부
Issue Date
2015-02
Publisher
서울대학교 대학원
Keywords
orbifoldsymplectic geometryMaslov indexorbifold embeddingorbifold Quantum cohomologyDiophantine equation
Description
학위논문 (박사)-- 서울대학교 대학원 : 수리과학부, 2015. 2. 조철현.
Abstract
We study symplectic geometry of orbifolds, especially which are necessary to extend the Lagrangian intersection Floer theory to the one of orbifold setting. First, we give another definition of the Maslov indices of bundle pairs via curvature integral of L-orthogonal unitary connection. This definition naturally extends to the one of orbi-bundle pairs with interior singularities. Secondly, we investigate the notion of orbifold embedding. When the target orbifold is a global quotient of a smooth manifold by the action of a Lie group G, we show that orbifold embeddings are equivariant with G-equivariant immersions.
In the last part of the dissertation, we compute quantum cohomology of elliptic P1 orbifolds via classifying holomorphic orbi-spheres in those orbifolds. Interestingly, we find that these orbi-spheres have an one-to-one correspondence with the solutions of certain Diophantine equations depending on the lattice structures on the universal covers of elliptic P1 orbifolds constructed from the preimages of three singular points.
Language
English
URI
https://hdl.handle.net/10371/121289
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College of Natural Sciences (자연과학대학)Dept. of Mathematical Sciences (수리과학부)Theses (Ph.D. / Sc.D._수리과학부)
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