Classificação de módulos de peso sobre álgebras de Weyl / Classification of weight modules over Weyl algebras

Oliveira, André Silva de

28 April 2016

Neste trabalho, introduzimos as álgebras de Weyl clássicas A = A_n e as generalizadas A = D(sigma, a). Apresentamos algumas propriedades importantes dessas álgebras, dentre outras, que a n-ésima álgebra de Weyl A_n é um domínio simples Noetheriano à esquerda. Introduzimos os módulos de peso sobre A e estudamos os A-módulos de peso projetivos. Iniciamos a classificação dos A-módulos de peso simples (isto é, irredutíveis) através de uma categoria linear C_O e do seu esqueleto S_O cf. A classificação total dos A_infty-módulos de peso simples é dada utilizando a ação de certas localizações no anel de polinômios cf. Classificamos os blocos do tipo mansa na categoria dos A-módulos de peso localmente finitos e determinamos os A-módulos indecomponíveis nos blocos do tipo mansa. Seguindo, descrevemos os A-módulos de peso injetivos e projetivos indecomponíveis e deduzimos uma descrição dos blocos na categoria dos A-módulos de peso por quivers e relações. / In this dissertation, we introduce the classical Weyl algebras A = A_n and the generalized A = D(sigma, a). There are some important properties of these algebras, among others, that the n-th Weyl algebra A_n is a left Noetherian simple domain. We introduced the weight modules over A and study the projective weight A-modules. Started the classification of simple weight A-modules (this is, irreducible) by linear category C_O and its skeleton S_O in accordance with. The complete classification of simple weight A-modules is given using the action of certain localizations in the polynomial ring in accordance with. We classify the tame blocks in the category of locally-finite weight A-modules and determine the indecomposable A-modules in the tame blocks. Following, we describe indecomposable projective and injective weight A-modules and deduce the description of the blocks in the category of weight A-modules by quivers and relations.

Álgebras de Weyl

Indecomposable weight modules

Módulos de peso indecomponíveis

Módulos de peso simples

Simple weight modules

Weyl algebras

Classificação dos sl(3)-módulos de Gelfand-Tsetlin irredutíveis. / Classification of irreducible Gelfand-Tsetlin sl(3)-modules.

Ramírez, Luis Enrique

08 March 2013

Neste trabalho construímos e apresentamos realizações explicitas de todos os sl(3)-módulos de Gelfand-Tsetlin irredutíveis. / In this work we construct and give explicit realizations for all irreducible Gelfand-Tsetlin modules for the Lie algebra sl(3).

Bases de Gelfand-Tsetlin

Gelfand-Tsetlin bases

Gelfand-Tsetlin modules

Módulos de Gelfand-Tsetlin

Módulos de peso.

Weight modules.

Morita equivalence and isomorphisms between general linear groups.

January 1994

by Lok Tsan-ming. / Thesis (M.Phil.)--Chinese University of Hong Kong, 1994. / Includes bibliographical references (leaves 74-75). / Introduction --- p.2 / Chapter 1 --- "Rings, Modules and Categories" --- p.4 / Chapter 1.1 --- "Rings, Subrings and Ideals" --- p.5 / Chapter 1.2 --- Modules and Categories --- p.8 / Chapter 1.3 --- Module Theory --- p.13 / Chapter 2 --- Isomorphisms between Endomorphism rings of Quasiprogener- ators --- p.24 / Chapter 2.1 --- Preliminaries --- p.24 / Chapter 2.2 --- The Fundamental Theorem --- p.31 / Chapter 2.3 --- Isomorphisms Induced by Semilinear Maps --- p.41 / Chapter 2.4 --- Isomorphisms of General linear groups --- p.46 / Chapter 3 --- Endomorphism ring of projective module --- p.54 / Chapter 3.1 --- Preliminaries --- p.54 / Chapter 3.2 --- Main Theorem --- p.60 / Bibliography --- p.74

Categories (Algebra)

Modules (Algebra)

Rings (Algebra)

Isomorphisms (Mathematics)

Endomorphism rings

Linear algebraic groups

Projective modules (Algebra)

On chain domains, prime rings and torsion preradicals.

Van den Berg, John Eric.

January 1995

Abstract available in pdf file.

Modules (Algebra).

Rings (Algebra).

Model theory.

Radical Theory.

Theses--Mathematics.

Rings (Algebra).

Modules (Algebra).

Classificação de módulos de peso sobre álgebras de Weyl / Classification of weight modules over Weyl algebras

André Silva de Oliveira

28 April 2016

Neste trabalho, introduzimos as álgebras de Weyl clássicas A = A_n e as generalizadas A = D(sigma, a). Apresentamos algumas propriedades importantes dessas álgebras, dentre outras, que a n-ésima álgebra de Weyl A_n é um domínio simples Noetheriano à esquerda. Introduzimos os módulos de peso sobre A e estudamos os A-módulos de peso projetivos. Iniciamos a classificação dos A-módulos de peso simples (isto é, irredutíveis) através de uma categoria linear C_O e do seu esqueleto S_O cf. A classificação total dos A_infty-módulos de peso simples é dada utilizando a ação de certas localizações no anel de polinômios cf. Classificamos os blocos do tipo mansa na categoria dos A-módulos de peso localmente finitos e determinamos os A-módulos indecomponíveis nos blocos do tipo mansa. Seguindo, descrevemos os A-módulos de peso injetivos e projetivos indecomponíveis e deduzimos uma descrição dos blocos na categoria dos A-módulos de peso por quivers e relações. / In this dissertation, we introduce the classical Weyl algebras A = A_n and the generalized A = D(sigma, a). There are some important properties of these algebras, among others, that the n-th Weyl algebra A_n is a left Noetherian simple domain. We introduced the weight modules over A and study the projective weight A-modules. Started the classification of simple weight A-modules (this is, irreducible) by linear category C_O and its skeleton S_O in accordance with. The complete classification of simple weight A-modules is given using the action of certain localizations in the polynomial ring in accordance with. We classify the tame blocks in the category of locally-finite weight A-modules and determine the indecomposable A-modules in the tame blocks. Following, we describe indecomposable projective and injective weight A-modules and deduce the description of the blocks in the category of weight A-modules by quivers and relations.

Álgebras de Weyl

Módulos de peso indecomponíveis

Módulos de peso simples

Indecomposable weight modules

Simple weight modules

Weyl algebras

Classificação dos sl(3)-módulos de Gelfand-Tsetlin irredutíveis. / Classification of irreducible Gelfand-Tsetlin sl(3)-modules.

Luis Enrique Ramírez

08 March 2013

Neste trabalho construímos e apresentamos realizações explicitas de todos os sl(3)-módulos de Gelfand-Tsetlin irredutíveis. / In this work we construct and give explicit realizations for all irreducible Gelfand-Tsetlin modules for the Lie algebra sl(3).

Bases de Gelfand-Tsetlin

Módulos de Gelfand-Tsetlin

Módulos de peso.

Gelfand-Tsetlin bases

Gelfand-Tsetlin modules

Weight modules.

The reduction of G-ordinary crystalline representations with G-structure / La réduction des représentations cristallines G-ordinaires avec G-structure

Peche Irissarry, Macarena

15 November 2016

Le foncteur D_cris de Fontaine nous permet d'obtenir des isocristaux à partir des représentations cristallines. Pour un groupe reductif G, on s'intéresse à étudier la réduction des réseaux dans une représentation cristalline avec G-structure V, vers les cristaux avec G-structure contenus dans D_cris(V). En utilisant la théorie des modules de Kisin, on donne une description de cette réduction en termes du groupe G, dans le cas où la représentation est (G-)ordinaire. Pour cela, il faut d'abord généraliser la construction de la filtration de Harder-Narasimhan des groupes p-divisibles, donnée par Fargues, aux modules de Kisin. / Fontaine’s D_cris functor allows us to associate an isocrystal to any crystalline representation. For a reductive group G, we study the reduction of lattices inside a germ of crystalline representations with G-structure V, to lattices (which are crystals) with G-structure inside D_cris(V). Using Kisin modules theory, we give a description of this reduction in terms of G, in the case when the representation V is (G-)ordinary. In order to do that, first we need to generalize Fargues’ construction of the Harder-Narasimhan filtration for p-divisible groups to Kisin modules.

Modules de Kisin

Représentations cristallines

Filtration de Harder-Narasimhan

G-structure

Crystalline representations

G-structure

Kisin modules

510

Design and fabrication of an underwater digital signal processor multichip module on low temperature cofired ceramic

Hayth-Perdue, Wendy

04 March 2009

An Underwater Digital Signal Processor (UDSP) multichip module (MCM) was designed and fabricated according to specifications outlined by the Naval Surface Warfare Center (NSWC), Dahlgren Division. Specifications indicated that low temperature cofired ceramic (L TCC) technology be used to fabricate the MCM with surface dimensions of 2"x2". The top surface of the module was to be designed to enclose mounted components and bare dice, and the bottom surface was to be equipped with a 144 pin grid array (PGA). The LTCC technology selected for this application incorporated DuPont's 951 Green Tape™ and compatible materials and pastes. A mixed metal system using inner silver system and outer surface gold system was used. Harris Corporation's FINESSE MCMTM, a computer-aided design (CAD) tool, was used to design the surface components and produce the circuit layout. FREESTYLE MCM™, an autorouter, was used to accomplish the routing of the signal layers. The design information provided by FINESSE MCM™ and FREESTYLE MCM™ was utilized to produce the artwork necessary for fabrication. Fabrication of the module was accomplished in part using thick film processes to produce the conducting areas on each layer. The layers were stacked in a press, laminated, and fired. Conducting areas were screen printed on the top surface of the module for wire bonding and on the bottom surface of the module for pin attachment. The main objectives of this thesis work were to convert silicon UDSP MCM to ceramic using LTCC, learn a new tool in CAD design that incorporates an autorouter, apply the tool to design a MCM-C module, and to develop criteria to evaluate the MCM. Future research work includes conducting line continuity testing, materials evaluation to determine reactions at interfaces and via filling, and resistance and electrical crosstalk measurements on the module. / Master of Science

LD5655.V855 1994.H398

Estruturas de Vertex em teoria de representações de álgebras de Lie / Vertex structures in representation theory of Lie algebras

Martins, Renato Alessandro

04 May 2012

Motivados pelos resultados do artigo [BBFK11], nosso trabalho começa analisando, no caso da álgebra de Lie afim sl(n;C), a possibilidade de se obter módulos de Verma J-imaginários, via representações análogas às feitas por Cox em [Cox05]. Inicialmente consideramos, por simplicidade, n = 2 e, só então, analisamos o caso geral. Depois, de modo análogo, estudamos os artigos [CF04] e [CF05] com o intuito de obter módulos J-intermediários de Wakimoto. Finalmente imbutimos, no caso n = 2, uma ação de álgebra de Virasoro nos módulos imaginários de Wakimoto, utilizando-nos do resultado exposto em [EFK98], em que tal problema é abordado para o caso dos módulos de Verma. Desta forma, obtemos equações análogas às de Knizhnik-Zamolodchikov (equações KZ) para os módulos imaginários de Wakimoto. / Following the results of [BBFK11], our work starts analyzing (for bsl(n;C)) if we can obtain J-imaginary Verma modules using similar representations used by Cox in [Cox05]. We did it for n = 2 and after, for the general case. The next step was the study of J-intermediate Wakimoto modules, following the ideas of [CF04] and [CF05]. To finish, for affine sl(2;C), we defined an action of Virasoro algebra on the imaginary Wakimoto modules following [EFK98] and we obtained an analogue of the KZ-equations for imaginary Wakimoto modules.

álgebras de Vertex.

classical Verma modules

imaginary Verma modules

intermediate Wakimoto modules

J-imaginary Verma modules

J-intermediate Wakimoto modules

módulos de Verma clássicos

módulos de Verma imaginários

módulos de Verma J-imaginários

módulos intermediários de Wakimoto

módulos J-intermediários de Wakimoto

Vertex algebras.

Estruturas de Vertex em teoria de representações de álgebras de Lie / Vertex structures in representation theory of Lie algebras

Renato Alessandro Martins

04 May 2012

Motivados pelos resultados do artigo [BBFK11], nosso trabalho começa analisando, no caso da álgebra de Lie afim sl(n;C), a possibilidade de se obter módulos de Verma J-imaginários, via representações análogas às feitas por Cox em [Cox05]. Inicialmente consideramos, por simplicidade, n = 2 e, só então, analisamos o caso geral. Depois, de modo análogo, estudamos os artigos [CF04] e [CF05] com o intuito de obter módulos J-intermediários de Wakimoto. Finalmente imbutimos, no caso n = 2, uma ação de álgebra de Virasoro nos módulos imaginários de Wakimoto, utilizando-nos do resultado exposto em [EFK98], em que tal problema é abordado para o caso dos módulos de Verma. Desta forma, obtemos equações análogas às de Knizhnik-Zamolodchikov (equações KZ) para os módulos imaginários de Wakimoto. / Following the results of [BBFK11], our work starts analyzing (for bsl(n;C)) if we can obtain J-imaginary Verma modules using similar representations used by Cox in [Cox05]. We did it for n = 2 and after, for the general case. The next step was the study of J-intermediate Wakimoto modules, following the ideas of [CF04] and [CF05]. To finish, for affine sl(2;C), we defined an action of Virasoro algebra on the imaginary Wakimoto modules following [EFK98] and we obtained an analogue of the KZ-equations for imaginary Wakimoto modules.

álgebras de Vertex.

módulos de Verma clássicos

módulos de Verma imaginários

módulos de Verma J-imaginários

módulos intermediários de Wakimoto

módulos J-intermediários de Wakimoto

classical Verma modules

imaginary Verma modules

intermediate Wakimoto modules

J-imaginary Verma modules

J-intermediate Wakimoto modules

Vertex algebras.