Tesi etd-05212020-105447 |
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Tipo di tesi
Tesi di laurea magistrale
Autore
STENHEDE, ERIC
URN
etd-05212020-105447
Titolo
Branched Covers, Open Books and Contact Structures
Dipartimento
MATEMATICA
Corso di studi
MATEMATICA
Relatori
relatore Prof. Lisca, Paolo
Parole chiave
- branched covers
- contact structures
- open books
Data inizio appello
12/06/2020
Consultabilità
Completa
Riassunto
In this thesis we study the relationship between branched covers, open book decompositions and contact structures in dimension three.
The main result shown is the one to one correspondence between
contact structures and open book decompositions up to positive stabi-
lization, now known as “Giroux’s correspondence”.
Then, we proceed to define contact branched covers and, using
Giroux’s correspondence together with a theorem by Montesinos and
Morton, we show that every closed contact 3-manifold can be obtained as
a 3-fold simple branched cover with base manifold the standard contact
3-sphere and branch set a transverse link.
Finally, we present a recent result by Etnyre and Casals concerning
the existence of a 4-components transverse universal link. This is a
transverse link in the standard contact 3–sphere such that all closed
contact 3–manifolds are contact branched covers over this link.
The main result shown is the one to one correspondence between
contact structures and open book decompositions up to positive stabi-
lization, now known as “Giroux’s correspondence”.
Then, we proceed to define contact branched covers and, using
Giroux’s correspondence together with a theorem by Montesinos and
Morton, we show that every closed contact 3-manifold can be obtained as
a 3-fold simple branched cover with base manifold the standard contact
3-sphere and branch set a transverse link.
Finally, we present a recent result by Etnyre and Casals concerning
the existence of a 4-components transverse universal link. This is a
transverse link in the standard contact 3–sphere such that all closed
contact 3–manifolds are contact branched covers over this link.
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