Ordering Garside groups / Ordres sur les groupes de Garside

Arcis, Diego

29 September 2017

Nous pre´sentons une condition sur les groupes de Garside que nous appelons la structure de Dehornoy. Une ite´ration d’une telle structure conduit a` une ordre a` gauche sur le groupe. Nous montrons des conditions pour qu’un groupe de Garside admet une structure de Dehornoy, et nous appliquons ce crite`re pour prouver que les groupes d’Artin de type A et I2(m), m ≥ 4, ont des structures de Dehornoy. Nous montrons que les ordres a` gauche sur les groupes d’Artin de type A obtenus a` partir de leurs structures de Dehornoy sont les ordres de Dehornoy. Dans le cas des groupes d’Artin du type I2(m), m ≥ 4, nous montrons que les ordres a` gauche de´rive´es de leurs structures de Dehornoy co¨ıncident avec les ordres obtenus a` partir des plongements de ces groupes dans les groupes de tresses. / We introduce a condition on Garside groups that we call Dehornoy structure. An iteration of such a structure leads to a left order on the group. We show conditions for a Garside group to admit a Dehornoy structure, and we apply these criteria to prove that the Artin groups of type A and I2(m), m ≥ 4, have Dehornoy structures. We show that the left orders on the Artin groups of type A obtained from their Dehornoy structures are the Dehornoy orders. In the case of the Artin groups of type I2(m), m ≥ 4, we show that the left orders derived from their Dehornoy structures coincide with the orders obtained from embeddings of the groups into braid groups.

Groupes d'Artin

Théorie de Garside

Groupes Ordonnables

Artin Groups

Garside Theory

Orderable Groups

510

Characterizing the strong two-generators of certain Noetherian domains

Green, Ellen Yvonne

01 January 1997

No description available.

Noetherian rings

Artin rings

Polynomial rings

Commutative rings

Associative rings

Rings (Algebra)

Algebra

Algebra

On ramifications of Artin-Schreier extensions of surfaces over algebraically closed fields of positive characteristic I / 正標数の代数閉体上の曲面のArtin-Schreier拡大の分岐についてI

Oi, Masao

25 November 2014

JSIAM Letters Vol. 6 (2014) p.33-36 / 京都大学 / 0048 / 新制・課程博士 / 博士(理学) / 甲第18639号 / 理博第4018号 / 新制||理||1579(附属図書館) / 31553 / 京都大学大学院理学研究科数学・数理解析専攻 / (主査)教授 池田 保, 教授 雪江 明彦, 教授 上田 哲生 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM

Algebraic surface

Ramification

Artin-Schreier extension

Algebraic geometry

0-cycle

400

Complexidade de Módulos / Complexity of Modules

Kameyama, Silvana

16 February 2012

A complexidade de um módulo M, sobre uma álgebra de dimensão finita R, é a medida do crescimento da dimensão de suas sizigias. No nosso trabalho, estudamos esse conceito, nos concentrando muito mais no caso das álgebras autoinjetiva. Relacionamos esse crescimento com o comportamento da componente do carcás de Auslander-Reiten, a qual o módulo M pertence. Em particular, estudamos, com bastante cuidado, o caso em que a complexidade é 1, o que significa que a dimensão das sizigias são eventualmente constante. Surpreendentemente, o comportamento de todos os módulos numa mesma componente é muito parecido. / The complexity of a module M under a finite dimensional algebra R is the measure of the growth of its syzygies\' dimension. In our work, we study this concept concentrating on the case of the selfinjective algebras. We relate this growth with the behavior of the Auslander-Reiten component containing this module. In particular, we study, carefully, the case in which the complexity is 1. Surprisingly, the behavior of every module in the same component as M is very similar.

álgebras autoinjetivas

Álgebras de Artin

Artin algebras

Auslander-Reiten quiver

Auslander-Reiten sequences.

Betti numbers

carcás de Auslander-Reiten

complexidade

complexity

números Betti

projectives resolutions

resoluções projetivas

selfinjective algebras

sequências de Auslander-Reiten.

Complexidade de Módulos / Complexity of Modules

Silvana Kameyama

16 February 2012

A complexidade de um módulo M, sobre uma álgebra de dimensão finita R, é a medida do crescimento da dimensão de suas sizigias. No nosso trabalho, estudamos esse conceito, nos concentrando muito mais no caso das álgebras autoinjetiva. Relacionamos esse crescimento com o comportamento da componente do carcás de Auslander-Reiten, a qual o módulo M pertence. Em particular, estudamos, com bastante cuidado, o caso em que a complexidade é 1, o que significa que a dimensão das sizigias são eventualmente constante. Surpreendentemente, o comportamento de todos os módulos numa mesma componente é muito parecido. / The complexity of a module M under a finite dimensional algebra R is the measure of the growth of its syzygies\' dimension. In our work, we study this concept concentrating on the case of the selfinjective algebras. We relate this growth with the behavior of the Auslander-Reiten component containing this module. In particular, we study, carefully, the case in which the complexity is 1. Surprisingly, the behavior of every module in the same component as M is very similar.

álgebras autoinjetivas

Álgebras de Artin

carcás de Auslander-Reiten

complexidade

números Betti

resoluções projetivas

sequências de Auslander-Reiten.

Artin algebras

Auslander-Reiten quiver

Auslander-Reiten sequences.

Betti numbers

complexity

projectives resolutions

selfinjective algebras

Symmetries of free and right-angled Artin groups

Wade, Richard D.

January 2012

The objects of study in this thesis are automorphism groups of free and right-angled Artin groups. Right-angled Artin groups are defined by a presentation where the only relations are commutators of the generating elements. When there are no relations the right-angled-Artin group is a free group and if we take all possible relations we have a free abelian group. We show that if no finite index subgroup of a group $G$ contains a normal subgroup that maps onto $mathbb{Z}$, then every homomorphism from $G$ to the outer automorphism group of a free group has finite image. The above criterion is satisfied by SL$_m(mathbb{Z})$ for $m geq 3$ and, more generally, all irreducible lattices in higher-rank, semisimple Lie groups with finite centre. Given a right-angled Artin group $A_Gamma$ we find an integer $n$, which may be easily read off from the presentation of $A_G$, such that if $m geq 3$ then SL$_m(mathbb{Z})$ is a subgroup of the outer automorphism group of $A_Gamma$ if and only if $m leq n$. More generally, we find criteria to prevent a group from having a homomorphism to the outer automorphism group of $A_Gamma$ with infinite image, and apply this to a large number of irreducible lattices as above. We study the subgroup $IA(A_Gamma)$ of $Aut(A_Gamma)$ that acts trivially on the abelianisation of $A_Gamma$. We show that $IA(A_Gamma)$ is residually torsion-free nilpotent and describe its abelianisation. This is complemented by a survey of previous results concerning the lower central series of $A_Gamma$. One of the commonly used generating sets of $Aut(F_n)$ is the set of Whitehead automorphisms. We describe a geometric method for decomposing an element of $Aut(F_n)$ as a product of Whitehead automorphisms via Stallings' folds. We finish with a brief discussion of the action of $Out(F_n)$ on Culler and Vogtmann's Outer Space. In particular we describe translation lengths of elements with regards to the `non-symmetric Lipschitz metric' on Outer Space.

512.4

Conjectura de Artin para pares de formas aditivas de grau 6 / Artin’s conjecture for pairs of additive sextic forms

Celis Cerón, M.A

25 April 2014

Submitted by Luanna Matias (lua_matias@yahoo.com.br) on 2015-02-05T10:05:56Z No. of bitstreams: 2 Dissertaçao - Mónica Andrea Celis Cerón - 2014.pdf: 566862 bytes, checksum: b41da2ec2c63c537f6b78488d3d8c179 (MD5) license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) / Approved for entry into archive by Luciana Ferreira (lucgeral@gmail.com) on 2015-02-05T10:59:19Z (GMT) No. of bitstreams: 2 Dissertaçao - Mónica Andrea Celis Cerón - 2014.pdf: 566862 bytes, checksum: b41da2ec2c63c537f6b78488d3d8c179 (MD5) license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) / Made available in DSpace on 2015-02-05T10:59:19Z (GMT). No. of bitstreams: 2 Dissertaçao - Mónica Andrea Celis Cerón - 2014.pdf: 566862 bytes, checksum: b41da2ec2c63c537f6b78488d3d8c179 (MD5) license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Previous issue date: 2014-04-25 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior - CAPES / Celis Cerón, Mónica Andrea. Artin’s conjecture for pairs of additive sextic forms. Goiânia, 2014. 62p. MSc. Dissertation. Instituto de Matemática e Estatística, Universidade Federal de Goiás. Consider the system of equations a1xk1+ a2xk2+ + asxks= 0; b1xk1+ b2xk2+ + bsxks= 0; where a1; a2; ; as; b1; b2; ; bs 2 Z A special case of Artin’s conjecture states that the above system must have nontrivial solutions in every p-adic field, Qp, provided only that s 2k2+ 1. In this text we show that the conjecture is true when k = 6. / Celis Cerón, Mónica Andrea. Conjectura de Artin para pares de formas aditivas de grau 6. Goiânia, 2014. 62p. Dissertação de Mestrado. Instituto de Matemática e Estatística, Universidade Federal de Goiás. Consideremos o sistema de equações a1xk1+ a2xk2+...+ asxks= 0; b1xk1+ b2xk2+ + bsxks= 0; onde, a 1; a 2; ; as; b1; b2; ; bs 2 Z. Um caso especial da conjectura de Artin nos diz que o sistema anterior tem solução não trivial em todo corpo p-ádico, Qp, sempre que s 2k2+ 1. Neste trabalho mostraremos que a conjectura é válida quando k = 6.

Solução p-ádica

Conjectura de Artin

Pares de formas aditivas

p-adic solubility

Artin’s conjecture

Pairs of additive forms

MATEMATICA::ALGEBRA

Condições de solubilidade p-ádica de pares de formas diagonais e alguns casos especiais / Conditions of p-adic solubility of pars of diagonal forms and some special cases

Ferreira, Alaídes Inácio Stival

January 2009

Submitted by Luciana Ferreira (lucgeral@gmail.com) on 2014-08-06T13:53:45Z No. of bitstreams: 2 license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Dissertacao_Alaides_Ferreira.pdf: 363902 bytes, checksum: 97bfa5be0bee9a9b8c283a12f0c24a18 (MD5) / Made available in DSpace on 2014-08-06T13:53:45Z (GMT). No. of bitstreams: 2 license_rdf: 23148 bytes, checksum: 9da0b6dfac957114c6a7714714b86306 (MD5) Dissertacao_Alaides_Ferreira.pdf: 363902 bytes, checksum: 97bfa5be0bee9a9b8c283a12f0c24a18 (MD5) Previous issue date: 2009 / This text is above solvability in systems of two forms additive over p-adics fields: with of degree k and variables n > 4k at lesat p > 3k4 ; with of degree an k odd integer at least n > 6k+1 variables; and with of degree 5 and p > 101 for n ≥ 31 variables, and for all p with n ≥ 36 variables, with the possible exceptions of p = 5 and p = 11. / Este texto é sobre solubilidade no corpo dos p-ádicos de sistemas de duas formas aditivas: com grau k e variáveis n > 4k apartir de p > 3k4 ; com grau k ímpar apartir de n > 6k +1 variáveis; e de grau 5 com p > 101 para n ≥ 31 variáveis, e para todo p com n ≥ 36 variáveis, com exceções de p = 5 e p = 11.

P-ádico

Sistema de duas formas aditivas

Conjectura de Artin

P-adic

Systems of two additive forms

Artin’s conjecture

CIENCIAS EXATAS E DA TERRA::MATEMATICA

Homologies d'algèbres Artin-Schelter régulières cubiques

Marconnet, Nicolas

09 December 2004

Les algèbres Artin-Schelter régulières sont des analogues non-commutatifs d'algèbres de polynomes. En dimension globale 3, ces algèbres graduées sont homogènes et ont des relations de degré 2 ou 3. Dans cette thèse, nous nous intéressons à certaines algèbres Artin-Schelter régulières de dimension globale 3, à relations cubiques. Nous commencons par calculer l'homologie de Hochschild des algèbres Artin-Schelter régulières de dimension globale 3, cubiques de type A à coefficients génériques. Soit $A$ une telle algèbre. Nous suivons la méthode employée par M. Van den Bergh (K-Theory 8 (1994) 213-230) dans le cas quadratique, en considérant cette algèbre comme déformation d'une algèbre de polynomes, avec crochet de Poisson remarquable. Nous calculons alors l'homologie de Poisson et nous montrons que la suite spectrale de Brylinski associée dégénère. Pour cela, nous utilisons le fait que cette algèbre est de Koszul au sens généralisé défini par R. Berger (J. Algebra 239 (2001) 705-734) et nous donnons un nouveau quasi-isomorphisme entre la résolution de Koszul de $A$ par des $A$-$A$-bimodules et la bar-résolution de $A$. Nous déduisons la cohomologie de de Rham, l'homologie cyclique et l'homologie cyclique périodique de l'homologie de Hochschild de $A$, en utilisant des résultats classiques. La propriété de Koszul généralisée nous permet d'écrire un quasi-isomorphisme explicite entre le complexe qui calcule la cohomologie de Hochschild de $A$ et le complexe qui calcule l'homologie de Hochschild de $A$, obtenant ainsi une dualité de Poincaré. Nous déduisons alors la cohomologie de Hochschild de $A$ de l'homologie de Hochschild de $A$. Nous déterminons le centre de $A$, ce qui n'était pas connu. Nous terminons par divers compléments. En particulier, nous explicitons une injection de la résolution de Koszul par des $A$-$A$-bimodules vers la bar-résolution de $A$, valable pour toute algèbre de Koszul généralisée $A$.

[MATH] Mathematics

algèbre homologique

algèbre non commutative

algèbres Artin-Schelter régulières

algèbres de Koszul généralisées

homologie de Hochschild

homologie de Poisson

Contribution à l'étude des transformations CR des structures de Cauchy-Riemann analytiques réelles

Sunyé, Jean-Charles

03 December 2010

Cette thèse est consacrée à l'étude de l'existence d'applications holomorphes entre des sous-variétés réelles dans des espaces complexes. On s'intéresse plus particulièrement à la convergence et à l'approximation à la Artin d'applications formelles entre sous-variétés réelles. Tout d'abord, on montre la convergence des applications formelles de jacobien non identiquement nul entre une sous-variété générique analytique réelle minimale et une sous-variété générique analytique réelle holomorphiquement non dégénérée. Grâce à ce résultat, on obtient la convergence de toutes les applications formelles entre une hypersurface analytique réelle minimale holomorphiquement non dégénérée et une hypersurface qui ne contient pas de courbe holomorphe. D'autre part, on établit la convergence de l'application de réflexion associée à une application formelle de jacobien non identiquement nul entre hypersurfaces lorsque l'hypersurface source est minimale. Cela nous permet ensuite de montrer un résultat d'approximation à la Artin dans ce même cas. Pour finir, on prouve un théorème artinien pour des applications CR lisses entre deux sous-variétés dans des espaces complexes de dimensions différentes.

[MATH] Mathematics

Application formelle

application CR

application holomorphe

sous-variété générique

théorème d'approximation de Artin

minimalité

non dégénérescence holomorphe