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Computation of Floer Invariant of (2; 2n)-Torus link Complement
by Lee, Jaepil, Ph.D., State University of New York at Stony Brook, 2013, 79; 3596400
Abstract (Summary)
A closed three manifold invariant Heegaard Floer homology was generalized to bordered Heegaard Floer homology, defined by Robert Lipshitz, Peter Ozsváth and Dylan Thurston. Bordered Heegaard Floer homology is an invariant of three manifold with connected boundary, and its variant doubly bordered Floer homology is a bimodule defined on three manifold with two disconnected boundary components. In this thesis, we compute bordered Floer homology of (2,2n)-torus link complement.
| Advisor: | Plamenevskaya, Olga |
| Commitee: | Kirillov, Alexander, Ozsvath, Peter, Viro, Oleg |
| School: | State University of New York at Stony Brook |
| Department: | Mathematics |
| School Location: | United States -- New York |
| Source: | DAI-B 75/01(E), Dissertation Abstracts International |
| Source Type: | DISSERTATION |
| Subjects: | Applied Mathematics, Mathematics |
| Keywords: | Bordered floer homology, Floer invariants, Heegaard floer homology, Link surgery, Link theory |
| Publication Number: | 3596400 |
| ISBN: | 978-1-303-42946-0 |
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