NORMAL TORI IN #_n(S2xS1) AND THE DEHN TWIST AUTOMORPHISMS OF THE FREE GROUP
| dc.contributor.advisor | Rafi, Kasra | |
| dc.creator | Gultepe, Funda | |
| dc.date.accessioned | 2019-04-27T21:20:46Z | |
| dc.date.available | 2019-04-27T21:20:46Z | |
| dc.date.issued | 2013 | |
| dc.description.abstract | The 3-dimensional space which renders a Out(F_n) action is M = #_n(S2x S1). The relation between M and Out(F_n) is that the latter is isomorphic to the mapping class group of M up to rotations about 2-spheres in M. | |
| dc.description.abstract | Associated to M is a rich algebraic structure coming from the essential 2-spheres that M contains. Inspired by this and combining the work of Whitehead with that of Laudenbach, Hatcher defined the notion of normal form with respect to a fixed sphere system and proved the existence of normal representatives of spheres in a given isotopy class of spheres in M. This is a local notion of minimal intersection of a sphere system with respect to a maximal sphere system in M. | |
| dc.description.abstract | In this work, a notion of being normal for tori in #_n(S2 xS1) is defined. This notion is crucial to determine minimality of intersections between tori and between spheres and tori. We prove two theorems regarding existence and uniqueness of normal representatives in a given homotopy class of tori. Then we define criteria for minimal intersection in a local sense and prove that a normal representative from a given homotopy class of tori satisfies it. | |
| dc.description.abstract | Just as there is a 1-1 correspondence between the equivalence classes of free splittings of the free group and the isotopy classes of embedded essential spheres in M, we prove that there is a 1-1 correspondence between the equivalence classes of Z- splittings of F_n and homotopy classes of embedded essential tori in M. This gives us the opportunity to understand Dehn twist automorphisms of the free group, since they are | |
| dc.description.abstract | defined with respect to Z- splittings. To this end, we define Dehn twist along a torus in M using the mapping classes of M and describe these twists with respect to their actions on the universal cover of M. | |
| dc.description.abstract | In addition, we give the motivation behind this work by stating possible applications and reasons for the importance of studying tori in this manifold. | |
| dc.format.extent | 78 pages | |
| dc.format.medium | application.pdf | |
| dc.identifier | 99109795302042 | |
| dc.identifier.uri | https://hdl.handle.net/11244/318446 | |
| dc.language | en_US | |
| dc.relation.requires | Adobe Acrobat Reader | |
| dc.subject | Torus (Geometry) | |
| dc.subject | Geometric group theory | |
| dc.subject | Automorphisms | |
| dc.subject | Mapping (Mathematics) | |
| dc.thesis.degree | Ph.D. | |
| dc.title | NORMAL TORI IN #_n(S2xS1) AND THE DEHN TWIST AUTOMORPHISMS OF THE FREE GROUP | |
| dc.type | text | |
| dc.type | document | |
| ou.group | College of Arts and Sciences::Department of Mathematics |
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