Global ETD Search

1	Quoric manifolds Hopkinson, Jeremy Franklin Lawrence January 2012 (has links) Davis and Januszkiewicz introduced in 1981 a family of compact real manifolds, the Quasi-Toric Manifolds, with a group action by a torus, a direct product of circle (T) groups. Their manifolds have an orbit space which is a simple polytope with a distinct isotropy subgroup associated to each face of the polytope, subject to some consistency conditions. They defined a characteristic function which captured the properties of the isotropy subgroups, and showed that their manifolds can be classified by the polytope and characteristic function. They further showed that the cohomology ring of the manifold can be written down directly from properties derived from the polytope and the characteristic function. This work considers the question of how far the circle group T can be replaced by the group of unit quaternions Q in the construction and description of quasi-toric manifolds. Unlike T, the group Q is not commutative, so the actions of Q n on the product H n of the set of quaternions using quaternionic multiplication are studied in detail. Then, in direct analogy to the quasi-toric manifolds, a family of compact real manifolds, the Quoric Manifolds, is introduced which have an action by Q n, and whose orbit space is a polytope. A characteristic functor is defined on the faces of the polytope which captures the properties of the isotropy classes of the orbits of the action. It is shown that quoric manifolds can be classified in a manner similar to the quasi-toric manifolds, by the polytope and characteristic functor. A restricted family, the global quoric manifolds, which satisfy an additional condition are defined. It is shown that an infinite number of polytopes exist in any dimension over which a global quoric manifold can be defined. It is shown that any global quoric manifold can be described as a quotient space of a moment angle complex over the polytope, and that its integral cohomology ring can be calculated, taking a form analagous to that in the quasi-toric case. 516.07
2	Quantum Toroidal Superalgebras Pereira Bezerra, Luan 05 1900 (has links) Indiana University-Purdue University Indianapolis (IUPUI) / We introduce the quantum toroidal superalgebra E(m\|n) associated with the Lie superalgebra gl(m\|n) and initiate its study. For each choice of parity "s" of gl(m\|n), a corresponding quantum toroidal superalgebra E(s) is defined. To show that all such superalgebras are isomorphic, an action of the toroidal braid group is constructed. The superalgebra E(s) contains two distinguished subalgebras, both isomorphic to the quantum affine superalgebra Uq sl̂(m\|n) with parity "s", called vertical and horizontal subalgebras. We show the existence of Miki automorphism of E(s), which exchanges the vertical and horizontal subalgebras. If m and n are different and "s" is standard, we give a construction of level 1 E(m\|n)-modules through vertex operators. We also construct an evaluation map from E(m\|n)(q1,q2,q3) to the quantum affine algebra Uq gl̂(m\|n) at level c=q3^(m-n)/2. Quantum toroidal Superalgebras Braid group action
3	Hromadné žaloby v českém procesním právu / Mass actions in Czech civil procedure Novotný, Vojtěch January 2016 (has links) Group actions in Czech procedural law Summary The thesis deals with an issue of group actions, which is a legal instrument of collective protection of private rights in civil proceedings. The aim of this thesis is to analyze this procedural institute, to point out shortcomings of current legislation and to propose it's acceptable solution. The thesis is divided into three relatively independent sections. The first section focuses on theoretical basis (including a brief outline of the historical development) and defines basic terminology used in the thesis. Then it describes the most general division of the collective enforcement mechanisms into a group action and a representative action. The second section concentrates on legislative schemes of group actions in certain foreign jurisdictions. Specifically, it deals with a legal conception of class action in the legal system of the USA, where it is applied as a kind of a opt-out group proceedings (group members, who does not agree with adjudication of their claims, may opt-out), then it deals with opt-in group proceedings in Sweden (group members can be required to enter the suit individually) and finally it describes a German model proceedings in capital market disputes, which represents a compromise between individual and collective proceedings. The third...
4	Finite orbits of the action of the pure braid group on the character variety of the Riemann sphere with five boundary components Calligaris, Pierpaolo January 2017 (has links) In this thesis, we classify finite orbits of the action of the pure braid group over a certain large open subset of the SL(2,C) character variety of the Riemann sphere with five boundary components, i.e. Σ5. This problem arises in the context of classifying algebraic solutions of the Garnier system G2, that is the two variable analogue of the famous sixth Painleve equation PVI. The structure of the analytic continuation of these solutions is described in terms of the action of the pure braid group on the fundamental group of Σ5. To deal with this problem, we introduce a system of co-adjoint coordinates on a big open subset of the SL(2,C) character variety of Σ5. Our classifica- tion method is based on the definition of four restrictions of the action of the pure braid group such that they act on some of the co-adjoint coordi- nates of Σ5 as the pure braid group acts on the co-adjoint coordinates of the character variety of the Riemann sphere with four boundary components, i.e. Σ4, for which the classification of all finite orbits is known. In order to avoid redundant elements in our final list, a group of symmetries G of the large open subset is introduced and the final classification is achieved modulo the action of G. We present a final list of 54 finite orbits. 515
5	Quantum Toroidal Superalgebras Luan Pereira Bezerra (8766687) 30 April 2020 (has links) <div> We introduce the quantum toroidal superalgebra E<sub>m\|n </sub>associated with the Lie superalgebra gl<sub>m\|n</sub> and initiate its study. For each choice of parity "s" of gl<sub>m\|n</sub>, a corresponding quantum toroidal superalgebra E<sub>s</sub> is defined. </div><div> </div><div><br></div><div>To show that all such superalgebras are isomorphic, an action of the toroidal braid group is constructed. </div><div><br></div><div>The superalgebra E<sub>s</sub> contains two distinguished subalgebras, both isomorphic to the quantum affine superalgebra U<sub>q</sub> sl̂<sub>m\|n</sub> with parity "s", called vertical and horizontal subalgebras. We show the existence of Miki automorphism of E<sub>s</sub>, which exchanges the vertical and horizontal subalgebras.</div><div><br></div><div>If <i>m</i> and <i>n</i> are different and "s" is standard, we give a construction of level 1 E<sub>m\|n</sub>-modules through vertex operators. We also construct an evaluation map from E<sub>m\|n</sub>(q<sub>1</sub>,q<sub>2</sub>,q<sub>3</sub>) to the quantum affine algebra U<sub>q</sub> gl̂<sub>m\|n</sub> at level c=q<sub>3</sub><sup>(m-n)/2</sup>.</div> Quantum toroidal Superalgebras Braid group action
6	Open Books on Contact Three Orbifolds Herr, Daniel 01 September 2013 (has links) In 2002, Giroux showed that every contact structure had a corresponding open book decomposition. This was the converse to a previous construction of Thurston and Winkelnkemper, and made open books a vital tool in the study of contact three-manifolds. We extend these results to contact orbifolds, i.e. spaces that are locally diffeomorphic to the quotient of a contact manifold and a compatible finite group action. This involves adapting some of the main concepts and constructions of three dimensional contact geometry to the orbifold setting. Contact Geometry Group Action Open Book Orbifold Topology Mathematics
7	Experimental Investigation of Group Action Factor for Bolted Wood Connections Anderson, Guy Thomas 03 January 2002 (has links) This thesis presents the results of testing to determine the significance of the group action factor at the 5% offset yield and capacity of single-shear bolted wood connections loaded parallel to grain. The single and multiple-bolt connections tested represent common connection geometries used in wood construction in the United States. The results of both monotonic and cyclic loading of connections are presented. Monotonic test data was used to determine an appropriately scaled CUREE Displacement Controlled Quasi-Static Cyclic Protocol. Overall, one hundred and eighty connections were tested using this cyclic protocol based on data obtained from thirty-three monotonic tests. Tested assemblies had geometric variables that include number of bolts per row, number of rows, bolt diameter, and side member material. In addition, the main and side member material and thickness were designed to produce three of the four major connection yield modes as defined by the 1997 National Design Specification for Wood Construction (AF&PA, 1997). Results from this research address the need for adequate spacing of bolts in a row to control the brittle connection behavior that directly affected the group action factor at capacity. / Master of Science Cyclic Loading Bolted Wood Connections Group Action Factor Mulitple Bolts
8	Non-Abelian reduction in deformation quantization Fedosov, Boris January 1997 (has links) We consider a G-invariant star-product algebra A on a symplectic manifold (M,ω) obtained by a canonical construction of deformation quantization. Under assumptions of the classical Marsden-Weinstein theorem we define a reduction of the algebra A with respect to the G-action. The reduced algebra turns out to be isomorphic to a canonical star-product algebra on the reduced phase space B. In other words, we show that the reduction commutes with the canonical G-invariant deformation quantization. A similar statement in the framework of geometric quantization is known as the Guillemin-Sternberg conjecture (by now completely proved). deformation quantization Hamiltonian group action moment map classical and quantum reduction Mathematics
9	Grupės ieškinio problemos / Problems of the group action Bagdonaitė, Lina 09 March 2006 (has links) Šiame darbe yra nagrinėjamos aktualios grupės ieškinio problemos. Darbą sudaro trys dalys. Pirmoje dalyje yra siekiama atskleisti grupės ieškinio vietą ieškininės gynybos sistemoje, nustatoma grupės ieškinio sąvoka bei esminiai bruožai. Antroje darbo dalyje yra bandoma atriboti grupės ieškinį nuo procesinio bendrininkavimo ir procesinio atstovavimo. Trečioje darbo dalyje yra siekiama nustatyti esminius grupės ieškinio ypatumus bei su jais susijusias problemas. / Substantial problems of group action are being discussed in this master’s writing. The purpose of this writing is to discover and analyze substantial and unsolved implementation problems of group action. Also there is trying to give legal analysis, to determine possible solutions. The basis of this writing is constructed of substantial and in Lithuanian civil process doctrine not discussed questions related to group action. We are trying to analyze foreign legal practice and to find solutions how to eliminate main obstructions in group action process. Law Grupės ieškinys Procesinis bendrininkavimas Viešasis interesas Class action Group action Procedural participation
10	Compact Group Actions on C-algebras: Classification, Non-Classifiability and Crossed Products and Rigidity Results for Lp-operator Algebras Gardella, Eusebio* 18 August 2015 (has links) This dissertation is concerned with representations of locally compact groups on different classes of Banach spaces. The first part of this work considers representations of compact groups by automorphisms of C-algebras, also known as group actions on C-algebras. The actions we study enjoy a freeness-type of property, namely finite Rokhlin dimension. We investigate the structure of their crossed products, mainly in relation to their classifiability, and compare the notion of finite Rokhlin dimension with other existing notions of noncommutative freeness. In the case of Rokhlin dimension zero, also known as the Rokhlin property, we prove a number of classification theorems for these actions. Also, in this case, much more can be said about the structure of the crossed products. In the last chapter of this part, we explore the extent to which actions with Rokhlin dimension one can be classified. Our results show that even for Z_2-actions on O_2, their classification is not Borel, and hence it is intractable. The second part of the present dissertation focuses on isometric representations of groups on Lp-spaces. For p=2, these are the unitary representations on Hilbert spaces. We study the Lp-analogs of the full and reduced group \ca s, particularly in connection to their rigidity. One of the main results of this work asserts that for p different from 2, the isometric isomorphism type of the reduced group Lp-operator algebra recovers the group. Our study of group algebras acting on Lp-spaces has also led us to answer a 20-year-old question of Le Merdy and Junge: for p different from 2, the class of Banach algebras that can be represented on an Lp-space is not closed under quotients. We moreover study representations of groupoids, which are a generalization of groups where multiplication is not always defined. The algebras associated to these objects provide new examples of Lp-operator algebras and recover some previously existing ones. Groupoid Lp-operator algebras are particularly tractable objects. For instance, while groupoid Lp-operator algebras can be classified by their K_0-group (an ordered, countable abelian group), we show that UHF-Lp-operator algebras not arising from groupoids cannot be classified by countable structures. This dissertation includes unpublished coauthored material. C*-algebras Classification Cossed product Group action Lp-space p-pseudofunctions

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