Spectral sequences for composite functors / Spektralsekvenser för sammansatta funktorer

Erlandsson, Adam

January 2022

Spectral sequences were developed during the mid-twentieth century as a way of computing (co)homology, and have wide uses in both algebraic topology and algebraic geometry.  Grothendieck introduced in his Tôhoku paper the Grothendieck spectral sequence, which given left exact functors $F$ and $G$ between abelian categories, uses the right-derived functors of $F$ and $G$ as initial data and converges to the right-derived functors of the composition $G\circ F.$  This thesis focuses on instead constructing a spectral sequence that uses the derived functors of $G$ and $G\circ F$ as initial data and converges to the derived functors of $F.$ Our approach takes inspiration from the construction of the Eilenberg-Moore spectral sequence, which given a fibration of topological spaces can calculate the singular cohomology of the fiber from the singular cohomology of the base space and total space. The Eilenberg-Moore spectral sequence can be constructed through the use of differential graded algebras and their bar construction, since this defines a double complex for which the column-wise filtration of the corresponding total complex induces the spectral sequence. The correct analogue of this with respect to composite functors is the bar construction for monads. Specifically, we let $G$ have an exact left adjoint $H$, which makes $G\circ H$ into a monad. Then, we extend our adjunction so that the derived functor $RG$ has left adjoint $RH$ in the corresponding derived categories, making $RG\circ RH$ into a monad. This allows us to apply the bar construction in the derived category, but we show that there emerge issues in obtaining a double complex and subsequent total complex from this construction.  Additionally, we present the essential theory of spectral sequences in general, and of the Serre, Eilenberg-Moore and Grothendieck spectral sequences in particular. / Spektralsekvenser utvecklades under mitten av 1900-talet som ett verktyg för att beräkna (ko)homologi, och har många användningsområden inom både algebraisk topologi och algebraisk geometri. Grothendieck introducerade i sin Tôhoku-artikel Grothendieck-spektralsekvensen, som givet vänsterexakta funktorer $F$ och $G$ mellan abelska kategorier använder de högerderiverade funktorerna av $F$ och $G$ som initialdata och som konvergerar till de högerderiverade funktorerna av kompositionen $G\circ F$. Denna masteruppsats fokuserar på att istället konstruera en spektralsekvens som använder de deriverade funktorerna av $G$ och $G\circ F$ som initialdata och konvergerar till de deriverade funktorerna av $F$. Vår metod tar inspiration från konstruktionen av Eilenberg-Moore-spektralsekvensen, som givet en fibrering av topologiska rum kan beräkna den singulära kohomologin av fibern från den singulära kohomologin av basrummet och totalrummet. Eilenberg-Moore spektralsekvensen kan konstrueras genom användningen av graderade differentialalgebror och deras bar-konstruktion, eftersom detta definierar ett dubbelkomplex vars kolumnvisa filtrering av det resulterande totalkomplexet inducerar spektralsekvensen. Vad gäller kompositioner av funktorer så är den korrekta analogin till detta bar-konstruktionen för monader. Specifikt så låter vi $G$ ha en exakt vänsteradjungerad funktor $H$, vilket gör $G\circ H$ till en monad. Sedan utvidgar vi denna adjunktion sådant att den deriverade funktorn $RG$ har vänsteradjunkt $RH$ i den deriverade kategorin, vilket gör $RG\circ RH$ till en monad. Detta ger oss möjligheten att använda bar-konstruktionen i den deriverade kategorin, men vi visar att det uppstår problem när vi ska definiera ett dubbelkomplex och resulterande totalkomplex från denna konstruktion. Utöver detta så innehåller denna uppsats en genomgång av den viktigaste teorin om spektralsekvenser i allmänhet, och om Serre-, Eilenberg-Moore- och Grothendieck-spektralsekvensen i synnerhet.

Algebraic topology

homological algebra

spectral sequences

fibrations

derived functors

derived categories

Algebraisk topologi

homologisk algebra

spektralsekvenser

fibreringar

deriverade funktorer

deriverade kategorier

Other Mathematics

Annan matematik

A classification of localizing subcategories by relative homological algebra

Nadareishvili, George

16 October 2015

No description available.

510

C*-algebra

Kasparov category

homological algebra

triangulated category

non-commutative topology

filtrations of C*-algebras

C*-algebras over a topological space

localizing subcategory

localising subcategory

Bivariant K-theory

Filtrated K-theory

relative homological algebra

bootstrap class

KK-theory

ring of upper triangular matrices

Mathematics (PPN61756535X)

A POÉTICA DO CONTO E A QUESTÃO DO OLHAR NA LITERATURA.

Morais, Rogério Cavalcante de

19 February 2016

Made available in DSpace on 2016-08-10T11:07:16Z (GMT). No. of bitstreams: 1 ROGERIO CAVALCANTE DE MORAIS.pdf: 2888343 bytes, checksum: 703c15350891bd366f004d12d08a2c12 (MD5) Previous issue date: 2016-02-19 / This thesis aims to establish relationships between different artistic systems involving intertextualities and relations between text and image. We analyze homological procedures between them. Selected texts from different periods, styles and language system. These texts are listed in order to provide readings that can mobilize fruitful way of the senses. The corpus is made up of the stories; "The telltale heart," Edgar Allan Poe, "Love", by Clarice Lispector, and screens; "Luncheon on the Grass" by Édouard Manet, and "Lovers" by René Magritte. We analyze the existing dialogue in the look between the two languages, verbal and plastic-visual. The work is theoretical basis authors dealing with intertextuality as well as analog and homological procedures addressing different systems. We demonstrate how the game looks permeates and immobilizes the form of artistic training. / Esta dissertação se propõe a estabelecer relações entre sistemas artísticos distintos envolvendo intertextualidades e relações entre texto e imagem. Analisaremos procedimentos homológicos entre eles. Para isso, selecionamos textos de diferentes épocas, estilos e sistema de linguagem. Esses textos serão relacionados de modo a propiciar leituras que possam mobilizar de maneira profícua os sentidos. O corpus é constituído pelos contos; O coração denunciador , de Edgar Allan Poe, Amor , de Clarice Lispector, e as telas; Almoço na Relva , de Édouard Manet, e Os amantes , de René Magritte. Analisaremos o diálogo existente no olhar entre as duas linguagens, verbal e plástico-visual. O trabalho tem como embasamento teórico, autores que tratam da intertextualidade bem como dos procedimentos analógicos e homológicos abordando sistemas diferentes. Demonstraremos como o jogo de olhares permeia e imobiliza a forma de capacitação artística.

Literatura

Relações homológicas

Édouard Manet

René Magritte

Edgar Allan Poe

Clarice Lispector

Literature

homological relations

Édouard Manet

René Magritte

Edgar Allan Poe

Clarice Lispector

Universal Coefficient Theorems in Equivariant KK-theory / Universelle Koeffizienten Theoreme in äquivarianter KK-theorie

Köhler, Manuel

15 December 2010

No description available.

K-theorie

KK-theorie

universelles Koeffizienten Theorem

C*-algebren

homologische Algebra

triangulierte Kategorien

Gruppenwirkung

zyklische Gruppe

K-theory

KK-theory

universal coefficient theorem

C*-algebras

homological algebra

triangulated categories

group action

cyclic group

The Ext-Algebra of Standard Modules of Bound Twisted Double Incidence Algebras

Norlén Jäderberg, Mika

January 2023

Quasi-hereditary algebras are an important class of algebras with many appli-cations in representation theory, most notably the representation theory of semi-simple complex Lie-algebras. Such algebras sometimes admit an exact Borel sub-algebra, that is a subalgebra satisfying similar formal properties to the Borel sub-algebras from Lie theory. This thesis is divided into two parts. In the first part we classify quasi-hereditary algebras with two simple modules over perfect fields up to Morita equivalence, generalizing a similar result by Membrillo-Hernandez for thealgebraically closed case. In the second part, we take a poset X, a certain set M of constants, and a finite set ρ of paths in the Hasse-diagram of X and construct analgebra A(X, M, ρ) that generalizes the twisted double incidence algebras originally introduced by Deng and Xi. We provide necessary and sufficient conditions for this algebra to be quasi-hereditary when X is a tree, and we show that A(X, M, ρ) admits an exact Borel subalgebra when these conditions are satisfied. Following this, we compute the Ext-algebra of the standard modules of A(X, M, ρ).

Algebras

Finite-dimensional

Partially ordered sets

Modules

Quasi-hereditary

Ext-algebra

Schur algebra

Quiver

Path algebra

Categories

Morita equivalence

Yoneda product

Standard module

Homological algebra

Cohomology

Anick Chains

Algebra and Logic

Algebra och logik

On Infravacua and the Superselection Structure of Theories with Massless Particles / Über Infravakua und die Superauswahlstruktur von Theorien mit masselosen Teilchen

Kunhardt, Walter

27 June 2001

No description available.

530 Physik

Superauswahlsektoren

Ladung

masselose Teilchen

langreichweitige Wechselwirkung

monoidale Kategorien

Infravakuum

Vakuum

Kozykel

Lokalisierung

superselection sectors

charge

massless particles

long-range interaction

monoidal catergories

infravacuum

vacuum

cocycles

localisation

33.24

EBID 100: Monoidal categories

symmetric monoidal categories

EIBT

Content Algebras and Zero-Divisors / Inhaltsalgebren und Nullteiler

Nasehpour, Peyman

10 February 2011

This thesis concerns two topics. The first topic, that is related to the Dedekind-Mertens Lemma, the notion of the so-called content algebra, is discussed in chapter 2. Let $R$ be a commutative ring with identity and $M$ be a unitary $R$-module and $c$ the function from $M$ to the ideals of $R$ defined by $c(x) = \cap \lbrace I \colon I \text{~is an ideal of~} R \text{~and~} x \in IM \rbrace $. $M$ is said to be a \textit{content} $R$-module if $x \in c(x)M $, for all $x \in M$. The $R$-algebra $B$ is called a \textit{content} $R$-algebra, if it is a faithfully flat and content $R$-module and it satisfies the Dedekind-Mertens content formula. In chapter 2, it is proved that in content extensions, minimal primes extend to minimal primes, and zero-divisors of a content algebra over a ring which has Property (A) or whose set of zero-divisors is a finite union of prime ideals are discussed. The preservation of diameter of zero-divisor graph under content extensions is also examined. Gaussian and Armendariz algebras and localization of content algebras at the multiplicatively closed set $S^ \prime = \lbrace f \in B \colon c(f) = R \rbrace$ are considered as well. In chapter 3, the second topic of the thesis, that is about the grade of the zero-divisor modules, is discussed. Let $R$ be a commutative ring, $I$ a finitely generated ideal of $R$, and $M$ a zero-divisor $R$-module. It is shown that the $M$-grade of $I$ defined by the Koszul complex is consistent with the definition of $M$-grade of $I$ defined by the length of maximal $M$-sequences in I$. Chapter 1 is a preliminarily chapter and dedicated to the introduction of content modules and also locally Nakayama modules.

content module

content algebra

locally Nakayama module

weak content algebra

few zero-divisors

Gaussian algebra

Armendariz algebra

zero-divisor graph

Grade

homological dimension

Property (A)

Zero-divisor module

semigroup ring

semigroup module

local cohomological module

McCoy's property

minimal prime

primal ring

31.23 - Ideale, Ringe, Moduln, Algebren

31.12 - Kombinatorik, Graphentheorie

13-02 - Research exposition

ddc:510