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11	On the construction of invariant tori and integrable Hamiltonians Kaasalainen, Mikko K. J. January 1994 (has links) The main principle of this thesis is to employ the geometric representation of Hamiltonian dynamics: in a broad sense, we study how to construct, in phase space, geometric structures that are related to a dynamical system. More specifically, we study the problem of constructing phase-space tori that are approximate invariant tori of a given Hamiltonian; also, using the constructed tori, we define an integrable Hamiltonian closely approximating the original one. The methods are generally applicable; as examples, we use gravitational potentials that are of interest in stellar dynamics. First, we construct tori for box and loop orbits in planar, barred potentials, thus demonstrating the applicability of the scheme to potentials that have more than one major orbit family. Also, we show that, in general, the construction scheme needs two types of canonical transformations together: point transformations as well as those expressed by generating functions. To complete the construction scheme, we show how to furnish the tori with consistent coordinate systems, i.e., how to recover the angle variables of a torus labelled by its actions. Next, the developed methods are employed in creating invariant phase-space tori in nonintegrable potentials supporting minor-orbit families. These tori are used to define an integrable Hamiltonian H<sub>0</sub>, and a modified form of the standard Hamiltonian perturbation theory is then used to demonstrate that a minor-orbit family can be treated as one made up of orbits trapped by a resonance of H<sub>0</sub>. Finally, we generalize the scheme further by constructing tori in time-reversal asymmetric Hamiltonians (by considering the motion in a rotating frame of reference), and study the transition from locally contained stochasticity to global chaos. Using both near-integrable 'laboratory' Hamiltonians and those for which we construct tori, we investigate the transition in the light of the resonance overlap criterion. 523.01 Hamiltonian systems : Torus (Geometry)
12	Nichtparametrische Minimalflächen vom Typ des Kreisrings und ihr Verhalten längs Kanten der Stützfläche Turowski, Gudrun. January 1998 (has links) Thesis (doctoral)--Bonn, 1997. / "Oktober 1997"--T.p. Includes bibliographical references (p. 150-153).
13	Constructions of open book decompositions Van Horn-Morris, Jeremy, January 1900 (has links) Thesis (Ph. D.)--University of Texas at Austin, 2007. / Vita. Includes bibliographical references.
14	3-barevnost grafů na toru / 3-Coloring Graphs on Torus Pekárek, Jakub January 2017 (has links) The theory of Dvořák et al. shows that a 4-critical triangle-free graph embedded in the torus has only a bounded number of faces of length greater than 4 and that the size of these faces is also bounded. We study the natural reduction in such embedded graphs-identification of opposite vertices in 4-faces. We give a computer-assisted argument showing that there are exactly four 4-critical triangle-free irreducible toroidal graphs in which this reduction cannot be applied without creating a triangle. Using this result we demonstrate several properties that are necessary for every triangle-free graph embedded in the torus to be 4-critical. Most importantly we demonstrate that every such graph has at most four 5-faces, or a 6-face and two 5-faces, or a 7-face and a 5-face, in addition to at least seven 4-faces. torus; barvení; coloring; grafy; graph
15	Erratum: Turning Double-Torus Links Inside Out (Journal of Knot Theory and Its Ramifications (1999) 8:6 (789-798)) Lane, S., Norwood, H., Norwood, R. 01 January 2013 (has links) No description available. double torus double-torus knot double-torus link t/i number Mathematics and Statistics
16	Erratum: Turning Double-Torus Links Inside Out (Journal of Knot Theory and Its Ramifications (1999) 8:6 (789-798)) Lane, S., Norwood, H., Norwood, R. 01 January 2013 (has links) No description available. double torus double-torus knot double-torus link t/i number Mathematics and Statistics
17	Degree-Regular Triangulations Of The Torus, The Klein Bottle And The Double-Torus Upadhyay, Ashish Kumar 02 1900 (has links) (PDF) No description available. Torus Algebraic Topology Combinatorial Topology Torus (Geometry) Klein Bottle Double-Torus Combinatorial 2-manifolds Euler Characteristic-2 Topology
18	Probing the star-formed region W3(OH) with ground-state hydroxyl masers Wright, Mark January 2001 (has links) No description available. 523.01 VLBA; OH masers; Arcs; Torus
19	Periodic orbit bifurcations and breakup of shearless invariant tori in nontwist systems Fuchss, Kathrin. January 1900 (has links) (PDF) Thesis (Ph. D.)--University of Texas at Austin, 2006. / Vita. Includes bibliographical references.
20	Circle Packings on Affine Tori Sass, Christopher Thomas 01 August 2011 (has links) This thesis is a study of circle packings for arbitrary combinatorial tori in the geometric setting of affine tori. Certain new tools needed for this study, such as face labels instead of the usual vertex labels, are described. It is shown that to each combinatorial torus there corresponds a two real parameter family of affine packing labels. A construction of circle packings for combinatorial fundamental domains from affine packing labels is given. It is demonstrated that such circle packings have two affine side-pairing maps, and also that these side-pairing maps depend continuously on the two real parameters. circle packing affine torus Riemann surface Analysis

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