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181	Analysis of the phase space, asymptotic behavior and stability for heavy symmetric top and tippe top Sköldstam, Markus January 2004 (has links) <p>In this thesis we analyze the phase of the heavy symmetric top and the tippe top. These tops are two examples of physical systems for which the usefulness of integrals of motion and invariant manifolds, in phase space picture analysis, can be illustrated</p><p>In the case of the heavy symmetric top, simplified proofs of stability of the vertical rotation have been perpetuated by successive textbooks during the last century. In these proofs correct perturbations of integrals of motion are missing. This may seem harmless since the deduced threshold value for stability is correct. However, perturbations of first integrals are essential in rigorous proofs of stability of motions for both tops.</p><p>The tippe top is a toy that has the form of a truncated sphere equipped with a little peg. When spun fast on the spherical bottom its center of mass rises above its geometrical center and after a few seconds the top is spinning vertically on the peg. We study the tippe top through a sequence of embedded invariant manifolds to unveil the structure of the top's phase space. The last manifold, consisting of the asymptotic trajectories, is analyzed completely. We prove that trajectories in this manifold attract solutions in contact with the plane of support at all times and we give a complete description of their stability/instability properties for all admissible choices of model parameters and of the initial conditions.</p> / Report code: LiU-TEK-LIC-2004:35. symmetric top tippe top vertical rotation truncated sphere asymptotic trajectories MATHEMATICS MATEMATIK
182	Locally anti de Sitter spaces and deformation quantization Claessens, Laurent 13 September 2007 (has links) The work is divided into three main parts. In a first time (chapter 1) we define a “BTZ” black hole in anti de Sitter space in any dimension. That will be done by means of group theoretical and symmetric spaces considerations. A physical “good domain” is identified as an open orbit of a subgroup of the isometry group of anti de Sitter. Then (chapter 2) we show that the open orbit is in fact isomorphic to a group (we introduce the notion of globally group type manifold) for which a quantization exists. The quantization of the black hole is performed and its Dirac operator is computed. The third part (appendix A and B) exposes some previously known results. Appendix A is given in a pedagogical purpose: it exposes generalities about deformation quantization and careful examples with SL(2,R), and split extensions of Heisenberg algebras. Appendix B is devoted to some classical results about homogeneous spaces and Iwasawa decompositions. Explicit decompositions are given for every algebra that will be used in the thesis. It serves to make the whole text more self contained and to fix notations. Basics of quantization by group action are given in appendix A.4. One more chapter is inserted (chapter 3). It contains two small results which have no true interest by themselves but which raise questions and call for further development. We discuss a product on the half-plane or, equivalently, on the Iwasawa subgroup of SL(2,R), due to A. Unterberger. We show that the quantization by group action machinery can be applied to this product in order to deform the dual of the Lie algebra of that Iwasawa subgroup. Although this result seems promising, we show by two examples that the product is not universal in the sense that even the product of compactly supported functions cannot be defined on AdS2 by the quantization induced by Unterberger's product. Then we show that the Iwasawa subgroup of SO(2,n) (i.e. the group which defines the singularity) is a symplectic split extension of the Iwasawa subgroup of SU(1,1) by the Iwasawa subgroup of SU(1,n). A quantization of the two latter groups being known, a quantization of SO(2,n) is in principle possible using an extension lemma. Properties of this product and the resulting quantization of AdSl were not investigated because we found a more economical way to quantize AdS4 . BTZ black hole Symmetric spaces Group theory Causal space Strict quantization
183	Preconditioning and iterative solution of symmetric indefinite linear systems arising from interior point methods for linear programming Chai, Joo-Siong, Toh, Kim Chuan 01 1900 (has links) We study the preconditioning of symmetric indefinite linear systems of equations that arise in interior point solution of linear optimization problems. The preconditioning method that we study exploits the block structure of the augmented matrix to design a similar block structure preconditioner to improve the spectral properties of the resulting preconditioned matrix so as to improve the convergence rate of the iterative solution of the system. We also propose a two-phase algorithm that takes advantage of the spectral properties of the transformed matrix to solve for the Newton directions in the interior-point method. Numerical experiments have been performed on some LP test problems in the NETLIB suite to demonstrate the potential of the preconditioning method discussed. / Singapore-MIT Alliance (SMA) preconditioning linear optimization iteration symmetric indefinite linear systems interior point solutions
184	Quasisymmetric Functions and Permutation Statistics for Coxeter Groups and Wreath Product Groups Hyatt, Matthew 22 July 2011 (has links) Eulerian quasisymmetric functions were introduced by Shareshian and Wachs in order to obtain a q-analog of Euler's exponential generating function formula for the Eulerian polynomials. They are defined via the symmetric group, and applying the stable and nonstable principal specializations yields formulas for joint distributions of permutation statistics. We consider the wreath product of the cyclic group with the symmetric group, also known as the group of colored permutations. We use this group to introduce colored Eulerian quasisymmetric functions, which are a generalization of Eulerian quasisymmetric functions. We derive a formula for the generating function of these colored Eulerian quasisymmetric functions, which reduces to a formula of Shareshian and Wachs for the Eulerian quasisymmetric functions. We show that applying the stable and nonstable principal specializations yields formulas for joint distributions of colored permutation statistics. The family of colored permutation groups includes the family of symmetric groups and the family of hyperoctahedral groups, also called the type A Coxeter groups and type B Coxeter groups, respectively. By specializing our formulas to these cases, they reduce to the Shareshian-Wachs q-analog of Euler's formula, formulas of Foata and Han, and a new generalization of a formula of Chow and Gessel. Signed permutations Colored permutations Permutation statistics Eulerian polynomials Quasisymmetric functions Symmetric functions
185	Schubert Numbers Kobayashi, Masato 01 May 2010 (has links) This thesis discusses intersections of the Schubert varieties in the flag variety associated to a vector space of dimension n. The Schubert number is the number of irreducible components of an intersection of Schubert varieties. Our main result gives the lower bound on the maximum of Schubert numbers. This lower bound varies quadratically with n. The known lower bound varied only linearly with n. We also establish a few technical results of independent interest in the combinatorics of strong Bruhat orders. Schubert variety Bruhat order Symmetric groups Flag variety Physical Sciences and Mathematics
186	Index Hypergeometric Transform and Imitation of Analysis of Berezin Kernels on Hyperbolic Spaces 03 April 2001 (has links) No description available.
187	Classification of second order symmetric tensors in the Lorentz metric Hjelm Andersson, Hampus January 2010 (has links) This bachelor thesis shows a way to classify second order symmetric tensors in the Lorentz metric. Some basic prerequisite about indefinite and definite algebra is introduced, such as the Jordan form, indefinite inner products, the Segre type, and the Minkowski space. There are also some results concerning the invariant 2-spaces of a symmetric tensor and a different approach on how to classify second order symmetric tensor. Indefinite linear algebra Lorentz metric Minkowski space symmetric tensors Segre type classification of canonical form MATHEMATICS MATEMATIK
188	Deformations of Quantum Symmetric Algebras Extended by Groups Shakalli Tang, Jeanette 2012 May 1900 (has links) The study of deformations of an algebra has been a topic of interest for quite some time, since it allows us to not only produce new algebras but also better understand the original algebra. Given an algebra, finding all its deformations is, if at all possible, quite a challenging problem. For this reason, several specializations of this question have been proposed. For instance, some authors concentrate their efforts in the study of deformations of an algebra arising from an action of a Hopf algebra. The purpose of this dissertation is to discuss a general construction of a deformation of a smash product algebra coming from an action of a particular Hopf algebra. This Hopf algebra is generated by skew-primitive and group-like elements, and depends on a complex parameter. The smash product algebra is defined on the quantum symmetric algebra of a nite-dimensional vector space and a group. In particular, an application of this result has enabled us to find a deformation of such a smash product algebra which is, to the best of our knowledge, the first known example of a deformation in which the new relations in the deformed algebra involve elements of the original vector space. Finally, using Hochschild cohomology, we show that these deformations are nontrivial. algebraic deformation theory Hopf algebras Hopf module algebras quantum symmetric algebras smash product algebras Hochschild cohomology
189	FTIR method for analysis of synthesis gas Broberg, Marina January 2013 (has links) The research institute ETC in Piteå is working with energy technical research and development. Today, much work revolves around research about renewable sources for fuel. In one project, biomass such as wood pellet is heated up while producing synthesis gas. The synthesis gas is then analyzed using three different GC techniques. ETC wanted to be able to make all their analysis on one instrument and with a faster speed. They contacted the company Rowaco in Linköping for help with developing a method on FTIR for analysis of the synthesis gas and that has been the aim for this thesis. A method has been developed for analysis of water, carbon monoxide, carbon dioxide and methane. The results from this thesis show that the concentrations of the molecules in the synthesis gas are outside the calibration curved that has been made and that the high concentrations give much interference to other molecules. The thesis also shows that many areas in the spectrum from the process are roof absorbers and there is also a contamination of water and carbon dioxide in the system. Suggested improvements are to find the source for the contamination, to develop calibration points with higher concentrations, to reduce the length of the gas cell and to dilute the gas before entering the FTIR. FTIR infrared spectroscopy synthesis gas syn gas vibration mode symmetric operation Michelson interferometer
190	Molecular Mechanisms Regulating Fate Determination of Cerebral Cortex Precursors Gauthier, Andree S. 24 September 2009 (has links) During development of the mammalian nervous system, neural stem cells generate neurons first and glia second, thereby allowing the initial establishment of neuronal circuitry, and subsequent matching of glial numbers and position to that circuitry. Multiple molecular mechanisms act in concert to control neural precursor expansion prior to neurogenesis, and to allow for an exponential generation of neurons while ensuring the maintenance of sufficient precursors to produce later-born neurons, glial cells and adult neural stem cells. Throughout cortical development, these processes are regulated in part by the precursors’ environment as well as intrinsic changes in precursors and their modes of division, which regulate the fate of daughter cells and the balance between self-renewal and differentiation. In the first part of this thesis, the protein tyrosine phosphatase SHP-2 was identified as a novel signaling protein that regulates the neurogenic to gliogenic switch by potentiating neurogenic signals and suppressing gliogenic signals until the appropriate developmental time point for astrogenesis, providing one mechanism whereby precursors integrate conflicting environmental cues. A Noonan Syndrome (NS)-associated activated SHP-2 mutation causes perturbations in neural cell genesis, which may contribute to the mild mental retardation and learning disabilities observed in NS patients. In the second part of this thesis, a novel Rho-regulatory pathway which includes the Rho-GEF Lfc and its negative regulator Tctex-1 were also found to regulate neurogenesis, potentially by directing mitotic spindle orientation during precursor divisions, thereby regulating the symmetric and asymmetric nature of radial precursor divisions. neural stem cells SHP-2 Lfc Tctex-1 neurogenesis gliogenesis symmetric divisions asymmetric divisions 0317

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