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You searched for +publisher:"University of Michigan" +contributor:("Scott, G. Peter"). Showing records 1 – 14 of 14 total matches.

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University of Michigan

1. Klodginski, Elizabeth A. Essential surfaces in fibered 3-manifolds.

Degree: PhD, Pure Sciences, 2003, University of Michigan

 Given a hyperbolic surface bundle over the circle M, we show that a class of immersed essential surfaces in M does not have the 1-line… (more)

Subjects/Keywords: Essential Surfaces; Fibered; Manifolds-three; Three-manifolds

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APA (6th Edition):

Klodginski, E. A. (2003). Essential surfaces in fibered 3-manifolds. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/123628

Chicago Manual of Style (16th Edition):

Klodginski, Elizabeth A. “Essential surfaces in fibered 3-manifolds.” 2003. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/123628.

MLA Handbook (7th Edition):

Klodginski, Elizabeth A. “Essential surfaces in fibered 3-manifolds.” 2003. Web. 28 Nov 2020.

Vancouver:

Klodginski EA. Essential surfaces in fibered 3-manifolds. [Internet] [Doctoral dissertation]. University of Michigan; 2003. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/123628.

Council of Science Editors:

Klodginski EA. Essential surfaces in fibered 3-manifolds. [Doctoral Dissertation]. University of Michigan; 2003. Available from: http://hdl.handle.net/2027.42/123628


University of Michigan

2. Matsumoto, Saburo. Subgroup separability of 3-manifold groups.

Degree: PhD, Mathematics, 1995, University of Michigan

 This dissertation examines the subgroup separability (LERF-ness) of 3-manifold groups and its relationship to incompressible immersed surfaces in those 3-manifolds. Burns, Karrass, and Solitar, in… (more)

Subjects/Keywords: Mathematics

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APA (6th Edition):

Matsumoto, S. (1995). Subgroup separability of 3-manifold groups. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/104666

Chicago Manual of Style (16th Edition):

Matsumoto, Saburo. “Subgroup separability of 3-manifold groups.” 1995. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/104666.

MLA Handbook (7th Edition):

Matsumoto, Saburo. “Subgroup separability of 3-manifold groups.” 1995. Web. 28 Nov 2020.

Vancouver:

Matsumoto S. Subgroup separability of 3-manifold groups. [Internet] [Doctoral dissertation]. University of Michigan; 1995. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/104666.

Council of Science Editors:

Matsumoto S. Subgroup separability of 3-manifold groups. [Doctoral Dissertation]. University of Michigan; 1995. Available from: http://hdl.handle.net/2027.42/104666


University of Michigan

3. Zupunski, Eric J. A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary.

Degree: PhD, Pure Sciences, 2007, University of Michigan

 We show approximately that the number of components in the JSJ decomposition of a compact, orientable, irreducible 3-manifold with incompressible boundary is bounded by a… (more)

Subjects/Keywords: Bound; Boundary; Complexity; Euler Characteristic; Heegaard Genus; Incompressible Boundaries; Jsj Decomposition; Manifolds-three

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APA (6th Edition):

Zupunski, E. J. (2007). A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/126873

Chicago Manual of Style (16th Edition):

Zupunski, Eric J. “A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary.” 2007. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/126873.

MLA Handbook (7th Edition):

Zupunski, Eric J. “A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary.” 2007. Web. 28 Nov 2020.

Vancouver:

Zupunski EJ. A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary. [Internet] [Doctoral dissertation]. University of Michigan; 2007. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/126873.

Council of Science Editors:

Zupunski EJ. A bound on the complexity of the JSJ decomposition of 3-manifolds with boundary. [Doctoral Dissertation]. University of Michigan; 2007. Available from: http://hdl.handle.net/2027.42/126873

4. Henry, Shawn J. Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms.

Degree: PhD, Mathematics, 2013, University of Michigan

 Topoi are categories which have enough structure to interpret higher order logic. They admit two notions of morphism: logical morphisms which preserve all of the… (more)

Subjects/Keywords: Topos Theory; Geometric Morphisms; Higher Order Logic; Mathematics; Science

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APA (6th Edition):

Henry, S. J. (2013). Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/99993

Chicago Manual of Style (16th Edition):

Henry, Shawn J. “Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms.” 2013. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/99993.

MLA Handbook (7th Edition):

Henry, Shawn J. “Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms.” 2013. Web. 28 Nov 2020.

Vancouver:

Henry SJ. Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms. [Internet] [Doctoral dissertation]. University of Michigan; 2013. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/99993.

Council of Science Editors:

Henry SJ. Classifying Topoi and Preservation of Higher Order Logic by Geometric Morphisms. [Doctoral Dissertation]. University of Michigan; 2013. Available from: http://hdl.handle.net/2027.42/99993

5. Mackay, John M. Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces.

Degree: PhD, Mathematics, 2008, University of Michigan

 The conformal dimension of a metric space measures the optimal dimension of the space under quasisymmetric deformations. We consider metric spaces that are locally connected… (more)

Subjects/Keywords: Conformal Dimension; Quasisymmetric Maps; Hyperbolic Group; Boundary at Infinity; Hausdorff Dimension; No Local Cut Points; Mathematics; Science

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APA (6th Edition):

Mackay, J. M. (2008). Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/60878

Chicago Manual of Style (16th Edition):

Mackay, John M. “Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces.” 2008. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/60878.

MLA Handbook (7th Edition):

Mackay, John M. “Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces.” 2008. Web. 28 Nov 2020.

Vancouver:

Mackay JM. Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces. [Internet] [Doctoral dissertation]. University of Michigan; 2008. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/60878.

Council of Science Editors:

Mackay JM. Conformal Dimension and the Quasisymmetric Geometry of Metric Spaces. [Doctoral Dissertation]. University of Michigan; 2008. Available from: http://hdl.handle.net/2027.42/60878

6. Chmutov, Michael S. The Structure of W-graphs Arising in Kazhdan-Lusztig Theory.

Degree: PhD, Mathematics, 2014, University of Michigan

 This thesis is primarily about the combinatorial aspects of Kazhdan-Lusztig theory. Central to this area is the notion of a W-graph, a certain weighted directed… (more)

Subjects/Keywords: W-graphs; Iwahori-Hecke Algebra; Combinatorial Representation Theory; Mathematics; Science

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APA (6th Edition):

Chmutov, M. S. (2014). The Structure of W-graphs Arising in Kazhdan-Lusztig Theory. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/108802

Chicago Manual of Style (16th Edition):

Chmutov, Michael S. “The Structure of W-graphs Arising in Kazhdan-Lusztig Theory.” 2014. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/108802.

MLA Handbook (7th Edition):

Chmutov, Michael S. “The Structure of W-graphs Arising in Kazhdan-Lusztig Theory.” 2014. Web. 28 Nov 2020.

Vancouver:

Chmutov MS. The Structure of W-graphs Arising in Kazhdan-Lusztig Theory. [Internet] [Doctoral dissertation]. University of Michigan; 2014. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/108802.

Council of Science Editors:

Chmutov MS. The Structure of W-graphs Arising in Kazhdan-Lusztig Theory. [Doctoral Dissertation]. University of Michigan; 2014. Available from: http://hdl.handle.net/2027.42/108802

7. Chen, Elizabeth R. A Picturebook of Tetrahedral Packings.

Degree: PhD, Mathematics, 2010, University of Michigan

 We explore many different packings of regular tetrahedra, with various clusters & lattices & symmetry groups. We construct a dense packing of regular tetrahedra, with… (more)

Subjects/Keywords: Crystallography; Lattice; Packing; Tetrahedra; Regular Solid; Hilbert Problem; Science

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APA (6th Edition):

Chen, E. R. (2010). A Picturebook of Tetrahedral Packings. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/75860

Chicago Manual of Style (16th Edition):

Chen, Elizabeth R. “A Picturebook of Tetrahedral Packings.” 2010. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/75860.

MLA Handbook (7th Edition):

Chen, Elizabeth R. “A Picturebook of Tetrahedral Packings.” 2010. Web. 28 Nov 2020.

Vancouver:

Chen ER. A Picturebook of Tetrahedral Packings. [Internet] [Doctoral dissertation]. University of Michigan; 2010. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/75860.

Council of Science Editors:

Chen ER. A Picturebook of Tetrahedral Packings. [Doctoral Dissertation]. University of Michigan; 2010. Available from: http://hdl.handle.net/2027.42/75860

8. Lassonde, Robin M. Splittings of Non-Finitely Generated Groups.

Degree: PhD, Mathematics, 2012, University of Michigan

 In geometric group theory one uses group actions on spaces to gain information about groups. One natural space to use is the Cayley graph of… (more)

Subjects/Keywords: Splittings; Mathematics; Science

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APA (6th Edition):

Lassonde, R. M. (2012). Splittings of Non-Finitely Generated Groups. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/91432

Chicago Manual of Style (16th Edition):

Lassonde, Robin M. “Splittings of Non-Finitely Generated Groups.” 2012. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/91432.

MLA Handbook (7th Edition):

Lassonde, Robin M. “Splittings of Non-Finitely Generated Groups.” 2012. Web. 28 Nov 2020.

Vancouver:

Lassonde RM. Splittings of Non-Finitely Generated Groups. [Internet] [Doctoral dissertation]. University of Michigan; 2012. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/91432.

Council of Science Editors:

Lassonde RM. Splittings of Non-Finitely Generated Groups. [Doctoral Dissertation]. University of Michigan; 2012. Available from: http://hdl.handle.net/2027.42/91432

9. Renardy, David. Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary.

Degree: PhD, Mathematics, 2016, University of Michigan

 Let M be a compact, hyperbolizable 3-manifold with boundary and let AH(M) denote the space of discrete faithful representations of the fundamental group of M… (more)

Subjects/Keywords: Kleinian Groups; Hyperbolic 3-manifolds; Mathematics; Science

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APA (6th Edition):

Renardy, D. (2016). Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/133206

Chicago Manual of Style (16th Edition):

Renardy, David. “Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary.” 2016. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/133206.

MLA Handbook (7th Edition):

Renardy, David. “Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary.” 2016. Web. 28 Nov 2020.

Vancouver:

Renardy D. Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary. [Internet] [Doctoral dissertation]. University of Michigan; 2016. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/133206.

Council of Science Editors:

Renardy D. Bumping in the Deformation Spaces of Hyperbolic 3-Manifolds with Compressible Boundary. [Doctoral Dissertation]. University of Michigan; 2016. Available from: http://hdl.handle.net/2027.42/133206

10. Mishchenko, Andrey Mikhaylovich. Rigidity of Thin Disk Configurations.

Degree: PhD, Mathematics, 2012, University of Michigan

 The main result of this thesis is a rigidity theorem for configurations of closed disks in the plane. More precisely, fix two collections C and… (more)

Subjects/Keywords: Circle Packing; Fixed-point Index; Discrete Complex Analysis; Plane Geometry; Mathematics; Science

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APA (6th Edition):

Mishchenko, A. M. (2012). Rigidity of Thin Disk Configurations. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/95930

Chicago Manual of Style (16th Edition):

Mishchenko, Andrey Mikhaylovich. “Rigidity of Thin Disk Configurations.” 2012. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/95930.

MLA Handbook (7th Edition):

Mishchenko, Andrey Mikhaylovich. “Rigidity of Thin Disk Configurations.” 2012. Web. 28 Nov 2020.

Vancouver:

Mishchenko AM. Rigidity of Thin Disk Configurations. [Internet] [Doctoral dissertation]. University of Michigan; 2012. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/95930.

Council of Science Editors:

Mishchenko AM. Rigidity of Thin Disk Configurations. [Doctoral Dissertation]. University of Michigan; 2012. Available from: http://hdl.handle.net/2027.42/95930

11. Watkins, Jordan P. The Rank Rigidity Theorem for Manifolds with No Focal Points.

Degree: PhD, Mathematics, 2013, University of Michigan

 We say that a Riemannian manifold M has rank at least k if every geodesic in M admits at least k parallel Jacobi fields. The… (more)

Subjects/Keywords: Rigidity; No Focal Points; Higher Rank; Duality Condition; Riemannian Manifolds; MSC - 53C24; Mathematics; Science

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APA (6th Edition):

Watkins, J. P. (2013). The Rank Rigidity Theorem for Manifolds with No Focal Points. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/99842

Chicago Manual of Style (16th Edition):

Watkins, Jordan P. “The Rank Rigidity Theorem for Manifolds with No Focal Points.” 2013. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/99842.

MLA Handbook (7th Edition):

Watkins, Jordan P. “The Rank Rigidity Theorem for Manifolds with No Focal Points.” 2013. Web. 28 Nov 2020.

Vancouver:

Watkins JP. The Rank Rigidity Theorem for Manifolds with No Focal Points. [Internet] [Doctoral dissertation]. University of Michigan; 2013. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/99842.

Council of Science Editors:

Watkins JP. The Rank Rigidity Theorem for Manifolds with No Focal Points. [Doctoral Dissertation]. University of Michigan; 2013. Available from: http://hdl.handle.net/2027.42/99842

12. Sahattchieve, Jordan A. Solutions to Two Open Problems in Geometric Group Theory.

Degree: PhD, Mathematics, 2012, University of Michigan

 We introduce a method for analyzing the convex hull of a set in non-positively curved piecewise Euclidean polygonal complexes and we apply this method to… (more)

Subjects/Keywords: Convex Hull; Coset Growth; CAT(0); Polycyclic; Mathematics; Science

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APA (6th Edition):

Sahattchieve, J. A. (2012). Solutions to Two Open Problems in Geometric Group Theory. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/93948

Chicago Manual of Style (16th Edition):

Sahattchieve, Jordan A. “Solutions to Two Open Problems in Geometric Group Theory.” 2012. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/93948.

MLA Handbook (7th Edition):

Sahattchieve, Jordan A. “Solutions to Two Open Problems in Geometric Group Theory.” 2012. Web. 28 Nov 2020.

Vancouver:

Sahattchieve JA. Solutions to Two Open Problems in Geometric Group Theory. [Internet] [Doctoral dissertation]. University of Michigan; 2012. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/93948.

Council of Science Editors:

Sahattchieve JA. Solutions to Two Open Problems in Geometric Group Theory. [Doctoral Dissertation]. University of Michigan; 2012. Available from: http://hdl.handle.net/2027.42/93948

13. Magid, Aaron D. Deformation Spaces of Kleinian Surface Groups are not Locally Connected.

Degree: PhD, Mathematics, 2009, University of Michigan

 For any closed surface S of genus g at least 2, we show that the deformation space of marked hyperbolic 3-manifolds homotopy equivalent to S,… (more)

Subjects/Keywords: Deformation Spaces of Hyperbolic 3-manifolds; Mathematics; Science

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APA (6th Edition):

Magid, A. D. (2009). Deformation Spaces of Kleinian Surface Groups are not Locally Connected. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/63689

Chicago Manual of Style (16th Edition):

Magid, Aaron D. “Deformation Spaces of Kleinian Surface Groups are not Locally Connected.” 2009. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/63689.

MLA Handbook (7th Edition):

Magid, Aaron D. “Deformation Spaces of Kleinian Surface Groups are not Locally Connected.” 2009. Web. 28 Nov 2020.

Vancouver:

Magid AD. Deformation Spaces of Kleinian Surface Groups are not Locally Connected. [Internet] [Doctoral dissertation]. University of Michigan; 2009. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/63689.

Council of Science Editors:

Magid AD. Deformation Spaces of Kleinian Surface Groups are not Locally Connected. [Doctoral Dissertation]. University of Michigan; 2009. Available from: http://hdl.handle.net/2027.42/63689


University of Michigan

14. Vavrichek, Diane M. Accessibility and JSJ Decompositions of Groups.

Degree: PhD, Mathematics, 2008, University of Michigan

 In this dissertation, we present two separate results in geometric group theory. The first is an accessibility result for hyperbolic groups with no 2-torsion. The… (more)

Subjects/Keywords: Group Accessibility; JSJ Decompositions; Bass-Serre Theory; Mathematics; Science

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APA (6th Edition):

Vavrichek, D. M. (2008). Accessibility and JSJ Decompositions of Groups. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/60755

Chicago Manual of Style (16th Edition):

Vavrichek, Diane M. “Accessibility and JSJ Decompositions of Groups.” 2008. Doctoral Dissertation, University of Michigan. Accessed November 28, 2020. http://hdl.handle.net/2027.42/60755.

MLA Handbook (7th Edition):

Vavrichek, Diane M. “Accessibility and JSJ Decompositions of Groups.” 2008. Web. 28 Nov 2020.

Vancouver:

Vavrichek DM. Accessibility and JSJ Decompositions of Groups. [Internet] [Doctoral dissertation]. University of Michigan; 2008. [cited 2020 Nov 28]. Available from: http://hdl.handle.net/2027.42/60755.

Council of Science Editors:

Vavrichek DM. Accessibility and JSJ Decompositions of Groups. [Doctoral Dissertation]. University of Michigan; 2008. Available from: http://hdl.handle.net/2027.42/60755

.