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- Type of Document: M.Sc. Thesis
- Language: Farsi
- Document No: 46064 (02)
- University: Sharif University of Technology
- Department: Mathematical Sciences
- Advisor(s): Esfahani Zadeh, Mostafa
- Abstract:
- In this essay we focus on the question of whether a 3-manifold (possibly with bound- ary) like M supports a codimension-1 transversely oriented foliation like F , such that F is transverse to ∂M and does not have Reeb components. If such foliation exists, then ∂M is necessarily a (possibly
empty) union of tori and (based on the works of Novikov, Reeb and Rosenberg) M is either S2 × S1(with F being the prod- uct foliation) or M is irreducible. In a paper by David Gabai, which we discuss, the sufficiency of these conditions is proved in case of non-trivial second homology group.Furthermore, from the works of Thurston it is concluded that compact leaves of such foliation are norm minimizing and Gabai shows that conversely, every norm minimizing surface in such manifold can be realised as a compact leaf of such foliation - Keywords:
- Foliation ; Sutured Manifold ; Three Dimentional ; Taut Foliations ; Knot Theory
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