Pure-injective modules over tubular algebras and string algebras

Harland, Richard James

January 2011

We show that, for any tubular algebra, the lattice of pp-definable subgroups of the direct sum of all indecomposable pure-injective modules of slope r has m-dimension 2 if r is rational, and undefined breadth if r is irrational- and hence that there are no superdecomposable pure-injectives of rational slope, but there are superdecomposable pure-injectives of irrational slope, if the underlying field is countable.We determine the pure-injective hull of every direct sum string module over a string algebra. If A is a domestic string algebra such that the width of the lattice of pp-formulas has defined breadth, then classify "almost all" of the pure-injective indecomposable A-modules.

510

Brief notes on equality issues / Breves notas en temas de igualdad

Proto Pisani, Andrea

12 April 2018

It is necessary put aside the idea that infinite economic development is the solution to terminate inequalities that exist in the world. Should consider a new model of society, which look for specify in the reality the value of justice, the hand of principles of equality and fraternity, where man is in a world of cooperation with others. / Es necesario dejar de lado la idea de que el desarrollo económico infinito es la solución para dar fin a las desigualdades existentes en el mundo. Debe plantearse un nuevo modelo de sociedad, el cual busque concretar en la realidad el valor de la justicia, de la mano de los principios de igualdad y fraternidad, donde el hombre se encuentre en un mundo de cooperación con los demás.

Economic Crisis

Financial Speculation

Infinite Development

Equality

Fraternity

Justice

Crisis Económica

Especulación Financiera

Desarrollo Infinito

Igualdad

Fraternidad

Justicia

Estimation Methods for Infinite-Dimensional Systems Applied to the Hemodynamic Response in the Brain

Belkhatir, Zehor

05 1900

Infinite-Dimensional Systems (IDSs) which have been made possible by recent advances in mathematical and computational tools can be used to model complex real phenomena. However, due to physical, economic, or stringent non-invasive constraints on real systems, the underlying characteristics for mathematical models in general (and IDSs in particular) are often missing or subject to uncertainty. Therefore, developing efficient estimation techniques to extract missing pieces of information from available measurements is essential. The human brain is an example of IDSs with severe constraints on information collection from controlled experiments and invasive sensors. Investigating the intriguing modeling potential of the brain is, in fact, the main motivation for this work. Here, we will characterize the hemodynamic behavior of the brain using functional magnetic resonance imaging data. In this regard, we propose efficient estimation methods for two classes of IDSs, namely Partial Differential Equations (PDEs) and Fractional Differential Equations (FDEs). This work is divided into two parts. The first part addresses the joint estimation problem of the state, parameters, and input for a coupled second-order hyperbolic PDE and an infinite-dimensional ordinary differential equation using sampled-in-space measurements. Two estimation techniques are proposed: a Kalman-based algorithm that relies on a reduced finite-dimensional model of the IDS, and an infinite-dimensional adaptive estimator whose convergence proof is based on the Lyapunov approach. We study and discuss the identifiability of the unknown variables for both cases. The second part contributes to the development of estimation methods for FDEs where major challenges arise in estimating fractional differentiation orders and non-smooth pointwise inputs. First, we propose a fractional high-order sliding mode observer to jointly estimate the pseudo-state and input of commensurate FDEs. Second, we propose a modulating function-based algorithm for the joint estimation of the parameters and fractional differentiation orders of non-commensurate FDEs. Sufficient conditions ensuring the local convergence of the proposed algorithm are provided. Subsequently, we extend the latter technique to estimate smooth and non-smooth pointwise inputs. The performance of the proposed estimation techniques is illustrated on a neurovascular-hemodynamic response model. However, the formulations are efficiently generic to be applied to a wide set of additional applications.

Estimation

infinite-dimensional systems

Distributed Parameter System

Fractional order systems

cerebral hemodynamic response

Functional Magnetic Resonance Imaging

Accuracy of semi-infinite diffusion theory to estimate tissue hemodynamics in layered slab models

Sabbir, Md Mainul Hasan

27 July 2021

No description available.

Physics

On Quasi-equivalence of Quasi-free KMS States restricted to an Unbounded Subregion of the Rindler Spacetime

Kähler, Maximilian

26 October 2017

The Unruh effect is one of the most startling predictions of quantum field theory. Its interpretation has been controversially discussed, since the first publications of Fulling, Davies and Unruh in the 1970ties. In a recent paper Buchholz and Solveen proposed an application of basic thermodynamic definitions to clarify the meaning of temperature and thermal equilibrium in the Unruh effect. As a result the interpretation of the KMS-parameter as an expression of local temperature has been questioned. The main result of my diploma thesis asserts quasi-equivalence of the disputed KMS states on a subregion of Rindlerspace that infinitely extends in the direction of travel of a uniformly accelerated Rindler-observer. Exploring the consequences of this result, I will present new insights on the asymptotic behaviour of such KMS states and how this fits into the picture drawn by Buchholz and Solveen.

info:eu-repo/classification/ddc/000

ddc:000

Obraz náboženství v počítačové hře Bioshock: Infinite / Image of religion in Bioshock. Infinite computer game

Kothera, Jiří

January 2020

Image of religion in Bioshock: Infinite computer game Master's thesis - Bc.Jiří Kothera Few mainstream computer games have caused such controversy as Bioshock: Infinite (Irrational Games, 2013). The third installment of the Bioshock series is set in the fictional city of Columbia in an alternate history of early twentieth century, which at first glance appears to be a perfect social utopia. After a while, however, the narrative begins to uncover the multilayered problems of society oppressed by a fraction of the white elite and religious fanaticism embodied by the character of Z.H.Comstock, the charismatic leader of the whole community. The popularity of the game and its stable position at the top of the various popularity charts are not only due to the attractive audiovisual processing and complex game mechanics. It is primarily a story that uses (for a mass audience product) an unprecedented amount of religious symbolism - especially Christian, historical references, polysemic story elements and the story based on the concepts of Frontier myth and American exceptionalism. This work deals with the analysis of narrative and religious-social phenomena appearing in the game, especially those that are directly related to the religious and nationalistic topics in the United States.

Shape Spaces and Shape Modelling: Analysis of planar shapes in a Riemannian framework

Kähler, Maximilian

16 April 2018

This dissertation presents some of the recent developments in the modelling of shape spaces. Forming the basis for a quantitative analysis of shapes, this is relevant for many applications involving image recognition and shape classification. All shape spaces discussed in this work arise from the general situation of a Lie group acting isometrically on some Riemannian manifold. The first chapter summarizes the most important results about this general set-up, which are well known in other branches of mathematics. A particular focus is laid on Hamiltonian methods that explore the relation of symmetry and conserved momenta. As a classical example these results are applied to Kendall’s shape space. More recent approaches of continuous shape models are then summarized and put in the same concise framework. In more detail the square root velocity shape representation, recently developed by Srivastava et al., is being discussed. In particular, the phenomenon of unclosed orbits under the action of reparametrization is addressed. This issue is partially resolved by an extended equivalence relation along with a well defined, non-degenerate, metric on the resulting quotient space.

info:eu-repo/classification/ddc/000

ddc:000

Weighted Logics and Weighted Simple Automata for Context-Free Languages of Infinite Words

Dziadek, Sven

26 March 2021

Büchi, Elgot and Trakhtenbrot provided a seminal connection between monadic second-order logic and finite automata for both finite and infinite words. This BET- Theorem has been extended by Lautemann, Schwentick and Thérien to context-free languages by introducing a monadic second-order logic with an additional existentially quantified second-order variable. This new variable models the stack of pushdown au- tomata. A fundamental study by Cohen and Gold extended the context-free languages to infinite words. Our first main result is a second-order logic in the sense of Lautemann, Schwentick and Thérien with the same expressive power as ω-context-free languages. For our argument, we investigate Greibach normal forms of ω-context-free grammars as well as a new type of Büchi pushdown automata, the simple pushdown automata. Simple pushdown automata do not use e-transitions and can change the stack only by at most one symbol. We show that simple pushdown automata of infinite words suffice to accept all ω-context-free languages. This enables us to use Büchi-type results recently developed for infinite nested words. In weighted automata theory, many classical results on formal languages have been extended into a quantitative setting. Weighted context-free languages of finite words trace back already to Chomsky and Schützenberger. Their work has been extended to infinite words by Ésik and Kuich. As in the theory of formal grammars, these weighted ω-context-free languages, or ω-algebraic series, can be represented as solutions of mixed ω-algebraic systems of equations and by weighted ω-pushdown automata. In our second main result, we show that (mixed) ω-algebraic systems can be trans- formed into Greibach normal form. We then investigate simple pushdown automata in the weighted setting. Here, we give our third main result. We prove that weighted simple pushdown automata of finite words recognize all weighted context-free languages, i.e., generate all algebraic series. Then, we show that weighted simple ω-pushdown automata generate all ω-algebraic series. This latter result uses the former result together with the Greibach normal form that we developed for ω-algebraic systems. As a fourth main result, we prove that for weighted simple ω-pushdown automata, Büchi-acceptance and Muller-acceptance are expressively equivalent. In our fifth main result, we derive a Nivat-like theorem for weighted simple ω- pushdown automata. This theorem states that the behaviors of our automata are precisely the projections of very simple ω-series restricted to ω-context-free languages. The last result, our sixth main result, is a weighted logic with the same expressive power as weighted simple ω-pushdown automata. To prove the equivalence, we use a similar result for weighted nested ω-word automata and apply our present result of expressive equivalence of Muller and Büchi acceptance.

info:eu-repo/classification/ddc/000

ddc:000

”Bring us the girl and wipe away the debt” : Didaktisk potential i multimodal fiktionsläsning

Mattsson, Edvard

January 2021

No description available.

multimodalitet

fiktionsläsning

didaktik

datorspel

svenska impulser

Bioshock Infinite

fritid

analys

literacy

det vidgade textbegreppet

General Literature Studies

Litteraturvetenskap

Children of Men, or, Europe: The Finite Task

Ramírez, J. Jesse

01 February 2021

No description available.

Europe, Infinite Task, Rodolphe Gasché

info:eu-repo/classification/ddc/320

ddc:320