Origami manifolds

• dc.contributor.advisor: Victor Guillemin.
• dc.contributor.author: Pissarra Pires, Ana Rita
• dc.contributor.other: Massachusetts Institute of Technology. Dept. of Mathematics.
• dc.date.copyright: 2010
• dc.date.issued: 2010
• dc.identifier.uri: http://hdl.handle.net/1721.1/60200
• dc.description: Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2010.
• dc.description: Cataloged from PDF version of thesis.
• dc.description: Includes bibliographical references (p. 51).
• dc.description.abstract: An origami manifold is a manifold equipped with a closed 2-form which is symplectic everywhere except on a hypersurface, where it is a folded form whose kernel defines a circle fibration. In this thesis I explain how an origami manifold can be unfolded into a collection of symplectic pieces and conversely, how a collection of symplectic pieces can be folded (modulo compatibility conditions) into an origami manifold. Using equivariant versions of these operations, I show how classic symplectic results of convexity and classification of toric manifolds translate to the origami world. Several examples are presented, including a complete classification of toric origami surfaces. Furthermore, I extend the results above to the case of nonorientable origami manifolds.
• dc.description.statementofresponsibility: by Ana Rita Pissarra Pires.
• dc.format.extent: 51 p.
• dc.language.iso: eng
• dc.publisher: Massachusetts Institute of Technology
• dc.subject: Mathematics.
• dc.type: Thesis
• dc.description.degree: Ph.D.
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.identifier.oclc: 681966912