The effect of coordination and common ground in online discussion a comparison of interactive processes in chat vs electronic bulletin boards /

Oaks, D'Arcy John,

January 2007

Thesis (Ph. D.)--Ohio State University, 2007. / Title from first page of PDF file. Includes bibliographical references (p. 96-102).

Représentations du groupe pseudo-orthogonal dans les espaces des formes différentielles homogènes / Representations of the pseudo-orthogonal group in the space of homogeneous differential forms.

Evseeva, Elena

20 September 2016

Dans cette thèse nous étudions des représentations du groupe de Lorentz dans les sections du fibré cotangent sur le cône isotrope. Grâce aux transformations de Fourier et de Poisson nous construisons explicitement tous les opérateurs de brisure de symétrie qui apparaissent dans les lois de branchement des produits tensoriels de telles représentations. / In this thesis we study representations of the Lorentz group acting on sectionsof the cotangent bundle over the isotropic cone. Using Fourier and Poisson transforms we construct explicitly all the symmetry breaking operators that appear in branching laws of tensor products of such representations.

Representations

Lie groups

Lois de branchement

Representations

Lie groups

Branching Laws

Studies of equivalent fuzzy subgroups of finite abelian p-Groups of rank two and their subgroup lattices

Ngcibi, Sakhile Leonard

January 2006

We determine the number and nature of distinct equivalence classes of fuzzy subgroups of finite Abelian p-group G of rank two under a natural equivalence relation on fuzzy subgroups. Our discussions embrace the necessary theory from groups with special emphasis on finite p-groups as a step towards the classification of crisp subgroups as well as maximal chains of subgroups. Unique naming of subgroup generators as discussed in this work facilitates counting of subgroups and chains of subgroups from subgroup lattices of the groups. We cover aspects of fuzzy theory including fuzzy (homo-) isomorphism together with operations on fuzzy subgroups. The equivalence characterization as discussed here is finer than isomorphism. We introduce the theory of keychains with a view towards the enumeration of maximal chains as well as fuzzy subgroups under the equivalence relation mentioned above. We discuss a strategy to develop subgroup lattices of the groups used in the discussion, and give examples for specific cases of prime p and positive integers n,m. We derive formulas for both the number of maximal chains as well as the number of distinct equivalence classes of fuzzy subgroups. The results are in the form of polynomials in p (known in the literature as Hall polynomials) with combinatorial coefficients. Finally we give a brief investigation of the results from a graph-theoretic point of view. We view the subgroup lattices of these groups as simple, connected, symmetric graphs.

Abelian groups

Fuzzy sets

Finite groups

Group theory

Polynomials

Multicultural Motivations: Power, Counterpower, Elites, and Independence

Zamat, Christopher

January 2016

This thesis examines the motivations for adopting multiculturalism. To this end, it examines a phenomenon that is commonplace in everyday life but is curiously absent from the academic literature: power. I argue that power provides a better causal explanation for the adoption of multiculturalism than previous explanations, such as desecuritization, and renders justifications for multiculturalism based exclusively on moral grounds insufficient and impractical in the world of politics. I divide the analysis into two parts: power acquisition as a factor that prompts dominant groups to enact multicultural policies, and power as a factor that enables non-dominant groups to mobilize for greater rights. In the process, I examine the structure of power in the modern nation-state, and claim, in short, that it is not only a network of boundaries, rules and institutions, but also an instrument used to delimit independence. I also claim that dominant groups will be most amenable to accepting multiculturalism if it does not alter the existing power praxis, and even reinforces the authority of the bearers of power. In areas of the world where multiculturalism is perceived as granting minorities too much power, it has been and will continue to be outright rejected. Moreover, I contend that minorities are not powerless and can effectively mobilize to acquire greater rights by engaging in ‘counterpower’. Ultimately, I conclude that the realistic prospects of diffusing multiculturalism, in light of the analysis of power, are poor, since in many areas of the world, authorities have too strong a grasp on power, and the counterpower of the masses is concordantly too weak. In this respect, a focus on the concept of power with regard to the adoption of multiculturalism reflects the political reality.

multiculturalism

power

counterpower

will to independence

minority groups

dominant groups

Asymptotic representations of shifted quantum affine algebras from critical K-theory

Liu, Huaxin

January 2021

In this thesis we explore the geometric representation theory of shifted quantum affine algebras 𝒜^𝜇, using the critical K-theory of certain moduli spaces of infinite flags of quiver representations resembling the moduli of quasimaps to Nakajima quiver varieties. These critical K-theories become 𝒜^𝜇-modules via the so-called critical R-matrix 𝑅, which generalizes the geometric R-matrix of Maulik, Okounkov, and Smirnov. In the asymptotic limit corresponding to taking infinite instead of finite flags, singularities appear in 𝑅 and are responsible for the shift in 𝒜^𝜇. The result is a geometric construction of interesting infinite-dimensional modules in the category 𝒪 of 𝒜^𝜇, including e.g. the pre-fundamental modules previously introduced and studied algebraically by Hernandez and Jimbo. Following Nekrasov, we provide a very natural geometric definition of qq-characters for our asymptotic modules compatible with the pre-existing definition of q-characters. When 𝒜^𝜇 is the shifted quantum toroidal gl₁ algebra, we construct asymptotic modules DT_𝜇 and PT_𝜇 whose combinatorics match those of (1-legged) vertices in Donaldson--Thomas and Pandharipande--Thomas theories. Such vertices control enumerative invariants of curves in toric 3-folds, and finding relations between (equivariant, K-theoretic) DT and PT vertices with descendent insertions is a typical example of a wall-crossing problem. We prove a certain duality between our DT_𝜇 and PT_𝜇 modules which, upon taking q-/qq-characters, provides one such wall-crossing relation.

Mathematics

Affine algebraic groups

Quantum groups

Toroidal harmonics

A topological invariant for continuous fields of Cuntz algebras / Cuntz環のバンドルの位相的不変量

Sogabe, Taro

24 November 2021

京都大学 / 新制・課程博士 / 博士(理学) / 甲第23564号 / 理博第4758号 / 新制||理||1682(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 泉 正己, 教授 COLLINS Benoit Vincent Pierre, 教授 加藤 毅 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM

Cuntz algebras

K-theory

automorphism groups

homotopy groups

bundles

400

On the Combinatorics of Certain Garside Semigroups

Cornwell, Christopher R.

06 July 2006

In his dissertation, F.A. Garside provided a solution to the word and conjugacy problems in the braid group on n-strands, using a particular element that he called the fundamental word. Others have since defined fundamental words in the generalized setting of Artin groups, and even more recently in Garside groups. We consider the problem of finding the number of representations of a power of the fundamental word in these settings. In the process, we find a Pascal-like identity that is satisfied in a certain class of Garside groups.

mathematics

geometric group theory

braid groups

Garside groups

combinatorics

Mathematics

Qualitative Description of College Students' Dinner Groups

Ball, Brita Michelle

21 April 2010

Objective: The purpose of this study was to discover how college students conduct dinner groups and students' perceptions of the benefits and difficulties of participation. Design: Qualitative study conducted with seven focus groups. Setting: A university campus. Participants: Thirty-six college students participating in dinner groups. Dinner groups were defined as a group of ≥3 people cooking for each other (or together) and eating together ≥4 times a week. Analysis: The focus groups were recorded, transcribed, coded, and reconciled. NUDIST® NVivo software was used in identifying themes and subthemes. Results: Dinner groups were composed of roommates and/or other students living nearby. They rotated who made each dinner. Benefits identified included social interaction, increasing confidence in cooking, saving money and time, and eating more varied and healthier foods. Difficulties were mentioned but were much less common. They included increased time spent on days the student cooked and stresses related to cooking on a schedule. Students found that the benefits far outweighed the difficulties and universally wanted to continue in a dinner group. Conclusions and Implications: College students enjoy dinner groups and promoting them may be an option for improving college students' eating habits. Nearly all students felt that they ate better in a dinner group but research is needed to assess actual intake.

nutrition

dinner groups

young adults

focus groups

Food Science

Nutrition

ONE-CUSPED CONGRUENCE SUBGROUPS OF SO(d, 1; Z)

Choi, Benjamin Dongbin

January 2022

The classical spherical and Euclidean geometries are easy to visualize and correspond to spaces with constant curvature 0 and +1 respectively. The geometry with constant curvature −1, hyperbolic geometry, is much more complex. A powerful theorem of Mostow and Prasad states that in all dimensions at least 3, the geometry of a finite-volume hyperbolic manifold (a space with local d-dimensional hyperbolic geometry) is determined by the manifold's fundamental group (a topological invariant of the manifold). A cusp is a part of a finite-volume hyperbolic manifold that is infinite but has finite volume (cf. the surface of revolution of a tractrix has finite area but is infinite). All non-compact hyperbolic manifolds have cusps, but only finitely many of them. In the fundamental group of such a manifold, each cusp corresponds to a cusp subgroup, and each cusp subgroup is associated to a point on the boundary of H^d, which can be identified with the (d − 1)-sphere. It is known that there are many one-cusped two- and three-dimensional hyperbolic manifolds. This thesis studies restrictions on the existence of 1-cusped hyperbolic d-dimensional manifolds for d ≥ 3. Congruence subgroups belong to a special class of hyperbolic manifolds called arithmetic manifolds. Much is known about arithmetic hyperbolic 3- manifolds, but less is known about arithmetic hyperbolic manifolds of higher dimensions. An important infinite class of arithmetic d-manifolds is obtained using SO(n, 1; Z), a subset of the integer matrices with determinant 1. This is known to produce 1-cusped examples for small d. Taking special congruence conditions modulo a fixed number, we obtain congruence subgroups of SO(n, 1; Z) which also have cusps but possibly more than one. We ask what congruence subgroups with one cusp exist in SO(n, 1; Z). We consider the prime congruence level case, then generalize to arbitrary levels. Covering space theory implies a relation between the number of cusps and the image of a cusp in the mod p reduced group SO(d+ 1, p), an analogue of the classical rotation Lie group. We use the sizes of maximal subgroups of groups SO(d + 1, p), and the maximal subgroups' geometric actions on finite vector spaces, to bound the number of cusps from below. Let Ω(d, 1; Z) be the index 2 subgroup in SO(d, 1; Z) that consists of all elements of SO(d, 1; Z) with spinor norm +1. We show that for d = 5 and d ≥ 7 and all q not a power of 2, there is no 1-cusped level-q congruence subgroup of Ω(d, 1; Z). For d = 4, 6 and all q not of the form 2^a3^b, there is no 1-cusped level-q congruence subgroup of Ω(d, 1; Z). / Mathematics

Mathematics

Algebraic groups

Arithmetic groups

Geometric topology

Hyperbolic geometry

Initial Trust Formation in Temporary Small Task Groups: Testing a Model of Swift Trust

Popa, Clara L.

05 May 2005

No description available.

temporary groups

swift trust

trust

organizational task groups