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81	On the N-body problem / Xie, Zhifu, January 2006 (has links) (PDF) Thesis (Ph. D.)--Brigham Young Dept. of Mathematics, 2006. / Includes bibliographical references (p. 87-90).
82	Finite W-algebras of classical type Brown, Jonathan, 1975- 06 1900 (has links) ix, 114 p. A print copy of this thesis is available through the UO Libraries. Search the library catalog for the location and call number. / In this work we prove that the finite W -algebras associated to nilpotent elements in the symplectic or orthogonal Lie algebras whose Jordan blocks are all the same size are quotients of twisted Yangians. We use this to classify the finite dimensional irreducible representations of these finite W -algebras. / Committee in charge: Jonathan Brundan, Co-Chairperson, Mathematics; Victor Ostrik, Co-Chairperson, Mathematics; Arkady Berenstein, Member, Mathematics; Hal Sadofsky, Member, Mathematics; Christopher Wilson, Outside Member, Computer & Information Science Finite W-algebras Nilpotent Symplectic Quantum algebra Mathematics W-algebras
83	Aspects of the symplectic and metric geometry of classical and quantum physics Russell, Neil Eric January 1993 (has links) I investigate some algebras and calculi naturally associated with the symplectic and metric Clifford algebras. In particular, I reformulate the well known Lepage decomposition for the symplectic exterior algebra in geometrical form and present some new results relating to the simple subspaces of the decomposition. I then present an analogous decomposition for the symmetric exterior algebra with a metric. Finally, I extend this symmetric exterior algebra into a new calculus for the symmetric differential forms on a pseudo-Riemannian manifold. The importance of this calculus lies in its potential for the description of bosonic systems in Quantum Theory. Symplectic manifolds Geometry, Differential Geometric quantization Quantum theory Clifford algebras
84	Spectral spread and non-autonomous Hamiltonian diffeomorphisms / spectral spreadと自励的ではないハミルトン微分同相写像について Sugimoto, Yoshihiro 25 March 2019 (has links) 京都大学 / 0048 / 新制・課程博士 / 博士(理学) / 甲第21541号 / 理博第4448号 / 新制\|\|理\|\|1639(附属図書館) / 京都大学大学院理学研究科数学・数理解析専攻 / (主査)教授小野薫, 教授向井茂, 教授望月拓郎 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DGAM symplectic geometry Floer homology Hamiltonian diffeomorphism group Hofer geometry 400
85	Invariant Lattices of Several Elliptic K3 Surfaces Fullwood, Joshua Joseph 29 July 2021 (has links) This work is concerned with computing the invariant lattices of purely non-symplectic automorphisms of special elliptic K3 surfaces. Brandhorst gave a collection of K3 surfaces admitting purely non-symplectic automorphisms that are uniquely determined up to isomorphism by certain invariants. For many of these surfaces, the automorphism is also unique or the automorphism group of the surface is finite and with a nice isomorphism class. Understanding the invariant lattices of these automorphisms and surfaces is interesting because of these uniqueness properties and because it is possible to give explicit generators for the Picard and invariant lattices. We use the methods given by Comparin, Priddis and Sarti to describe the Picard lattice in terms of certain special curves from the elliptic fibration of the surface. We use symmetries of the Picard lattice and fixed-point theory to compute the invariant lattices explicitly. This is done for all of Brandhorst's elliptic K3 surfaces having trivial Mordell-Weil group. elliptic surfaces purely non-symplectic automorphisms k3 surfaces Physical Sciences and Mathematics
86	Constructing Higher Order Conformal Symplectic Exponential Time Differencing Methods Amirzadeh, Lily S 01 January 2023 (has links) (PDF) Methods featured are primarily conformal symplectic exponential time differencing methods, with a focus on families of methods, the construction of methods, and the features and advantages of methods, such as order, stability, and symmetry. Methods are applied to the problem of the damped harmonic oscillator. Construction of both exponential time differencing and integrating factor methods are discussed and contrasted. It is shown how to determine if a system of equations or a method is conformal symplectic with flow maps, how to determine if a method is symmetric by taking adjoints, and how to find the stability region of a method. Exponential time differencing Stormer-Verlet is derived and is shown as the example for how to find the order of a method using Taylor series. Runge-Kutta methods, partitioned exponential Runge-Kutta methods, and their associated tables are introduced, with versions of Euler's method serving as examples. Lobatto IIIA and IIIB methods also play a key role, as a new exponential trapezoid rule is derived. A new fourth order exponential time differencing method is derived using composition techniques. It is shown how to implement this method numerically, and thus it is analyzed for properties such as error, order of accuracy, and structure preservation. Conformal symplectic damping order of accuracy exponential methods Mathematics
87	The Brauer Complex and Decomposition Numbers of Symplectic Groups Hogan, Ian 25 April 2017 (has links) No description available. Mathematics Brauer Complex Decomposition Numbers Defining Characteristic Symplectic Groups
88	Indice de Maslov : opérateurs d'entrelacement et revêtement universel du groupe symplectique Guenette, Robert. January 1981 (has links) No description available. Maslov index. Symplectic groups.
89	Symplectic topology, mirror symmetry and integrable systems. Rossi, Paolo 21 October 2008 (has links) (PDF) Using Sympelctic Field Theory as a computational tool, we compute Gromov-Witten theory of target curves using gluing formulas and quantum integrable systems. In the smooth case this leads to a relation of the results of Okounkov and Pandharipande with the quantum dispersionless KdV hierarchy, while in the orbifold case we prove triple mirror symmetry between GW theory of target P^1 orbifolds of positive Euler characteristic, singularity theory of a class of polynomials in three variables and extended affine Weyl groups of type ADE. Gromov-Witten theory Symplectic Field Theory Integrable Systems
90	Théorèmes de Künneth en homologie de contact Zenaidi, Naim 24 September 2013 (has links) L'homologie de contact est un invariant homologique pour variétés de contact dont la définition est basée sur l'utilisation de courbes holomorphes. Ce travail de thèse concerne l'étude de cet invariant dans le cas des produits de contact. / Doctorat en Sciences / info:eu-repo/semantics/nonPublished Mathématiques Homology theory Symplectic geometry Symplectic and contact topology Homologie Géométrie symplectique Topologie symplectique et de contact Contact geometry contact topology contact homology.

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