Global ETD Search

461	The shapes of sacred space : a proposed system of geometry used to lay out and design Maya art and architecture and some implications concerning Maya cosmology Powell, Christopher, 1959- 09 December 2010 (has links) This dissertation explores the fundamental characteristics of a system of geometry and proportion currently used by Maya house builders and shamans to design vernacular architecture in indigenous Maya communities. An extensive examination of Pre-Columbian Maya art and architecture demonstrates how this system of geometry and proportion was also used by the Maya of the Classic and Post-Classic periods. The dissertation concludes with a brief discussion of how Maya geometry was, and is, an expression of Maya cosmology and religion. / text Maya Geometry Art Architecture
462	PROBABILISTIC METRICS AND PROBABILITY MEASURES ON METRICS Stevens, Robert Ray, 1935- January 1965 (has links) No description available. Topology. Probabilities. Distance geometry.
463	PRODUCTS AND QUOTIENTS OF PROBABILISTIC METRIC SPACES Egbert, Russell James, 1937- January 1966 (has links) No description available. Distance geometry. Topology.
464	TOPOLOGY OF TORUS-LIKE FIBER SPACES Hall, Michael Henry, 1939- January 1966 (has links) No description available. Topology. Torus (Geometry)
465	LENS SPACES WITH SPECIAL COMPLEX COORDINATES Narvarte, John Anthony, 1940- January 1970 (has links) No description available. Manifolds (Mathematics) Geometry, Differential.
466	Ginzburg-Weinstein Isomorphisms for Pseudo-Unitary Groups Lamb, McKenzie Russell January 2009 (has links) Ginzburg and Weinstein proved in [GW92] that for a compact, semisimple Lie group K endowed with the Lu-Weinstein Poisson structure, there exists a Poisson diffeomorphism from the dual Poisson Lie group K* to the dual k* of the Lie algebra of K endowed with the Lie-Poisson structure. We investigate the possibility of extending this result to the pseudo-unitary groups SU (p, q ), which are semisimple but not compact. The main results presented here are the following. (1) The Ginzburg-Weinstein proof hinges on the existence of a certain vector field X on k. We prove that for any p, q, the analogous vector field for the SU (p, q ) case exists on an open subset of k. (2) Each generic dressing orbit ψ(λ) in the Poisson dual AN can be embedded in the complex flag manifold K/T . We show that for SU (1, 1) and SU (1, 2), the induced Poisson structure π(λ) on ψ(λ) extends smoothly to the entire flag manifold. (3) Finally, we prove the Ginzburg-Weinstein theorem for the SU (1, 1) case in two different ways: first, by constructing the vector field X in coordinates and proving that it satisfies the necessary properties, and second, by adapting the approach of [FR96] to the SU (1, 1) case. geometry Lie groups Poisson
467	Efficient reconstruction of 2D images and 3D surfaces Huang, Hui 05 1900 (has links) The goal of this thesis is to gain a deep understanding of inverse problems arising from 2D image and 3D surface reconstruction, and to design effective techniques for solving them. Both computational and theoretical issues are studied and efficient numerical algorithms are proposed. The first part of this thesis is concerned with the recovery of 2D images, e.g., de-noising and de-blurring. We first consider implicit methods that involve solving linear systems at each iteration. An adaptive Huber regularization functional is used to select the most reasonable model and a global convergence result for lagged diffusivity is proved. Two mechanisms---multilevel continuation and multigrid preconditioning---are proposed to improve efficiency for large-scale problems. Next, explicit methods involving the construction of an artificial time-dependent differential equation model followed by forward Euler discretization are analyzed. A rapid, adaptive scheme is then proposed, and additional hybrid algorithms are designed to improve the quality of such processes. We also devise methods for more challenging cases, such as recapturing texture from a noisy input and de-blurring an image in the presence of significant noise. It is well-known that extending image processing methods to 3D triangular surface meshes is far from trivial or automatic. In the second part of this thesis we discuss techniques for faithfully reconstructing such surface models with different features. Some models contain a lot of small yet visually meaningful details, and typically require very fine meshes to represent them well; others consist of large flat regions, long sharp edges (creases) and distinct corners, and the meshes required for their representation can often be much coarser. All of these models may be sampled very irregularly. For models of the first class, we methodically develop a fast multiscale anisotropic Laplacian (MSAL) smoothing algorithm. To reconstruct a piecewise smooth CAD-like model in the second class, we design an efficient hybrid algorithm based on specific vertex classification, which combines K-means clustering and geometric a priori information. Hence, we have a set of algorithms that efficiently handle smoothing and regularization of meshes large and small in a variety of situations. Image processing Geometry modeling
468	Geometry of Quantum States from Symmetric Informationally Complete Probabilities Tabia, Gelo Noel 25 June 2013 (has links) It is usually taken for granted that the natural mathematical framework for quantum mechanics is the theory of Hilbert spaces, where pure states of a quantum system correspond to complex vectors of unit length. These vectors can be combined to create more general states expressed in terms of positive semidefinite matrices of unit trace called density operators. A density operator tells us everything we know about a quantum system. In particular, it specifies a unique probability for any measurement outcome. Thus, to fully appreciate quantum mechanics as a statistical model for physical phenomena, it is necessary to understand the basic properties of its set of states. Studying the convex geometry of quantum states provides important clues as to why the theory is expressed most naturally in terms of complex amplitudes. At the very least, it gives us a new perspective into thinking about structure of quantum mechanics. This thesis is concerned with the structure of quantum state space obtained from the geometry of the convex set of probability distributions for a special class of measurements called symmetric informationally complete (SIC) measurements. In this context, quantum mechanics is seen as a particular restriction of a regular simplex, where the state space is postulated to carry a symmetric set of states called SICs, which are associated with equiangular lines in a complex vector space. The analysis applies specifically to 3-dimensional quantum systems or qutrits, which is the simplest nontrivial case to consider according to Gleason's theorem. It includes a full characterization of qutrit SICs and includes specific proposals for implementing them using linear optics. The infinitely many qutrit SICs are classified into inequivalent families according to the Clifford group, where equivalence is defined by geometrically invariant numbers called triple products. The multiplication of SIC projectors is also used to define structure coefficients, which are convenient for elucidating some additional structure possessed by SICs, such as the Lie algebra associated with the operator basis defined by SICs, and a linear dependency structure inherited from the Weyl-Heisenberg symmetry. After describing the general one-to-one correspondence between density operators and SIC probabilities, many interesting features of the set of qutrits are described, including an elegant formula for its pure states, which reveals a permutation symmetry related to the structure of a finite affine plane, the exact rotational equivalence of different SIC probability spaces, the shape of qutrit state space defined by the radial distance of the boundary from the maximally mixed state, and a comparison of the 2-dimensional cross-sections of SIC probabilities to known results. Towards the end, the representation of quantum states in terms of SICs is used to develop a method for reconstructing quantum theory from the postulate of maximal consistency, and a procedure for building up qutrit state space from a finite set of points corresponding to a Hesse configuration in Hilbert space is sketched briefly. quantum states geometry Physics
469	An application of Hilbert's projective metric to positive operators Reddien, George William 12 1900 (has links) No description available. Matrices Geometry, Projective
470	Periodic orbits of a dynamical system Lee, Philip Francis 08 1900 (has links) No description available. Mathematical analysis Geometry, Differential

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