Cohomology Jumping Loci and the Relative Malcev Completion

Narkawicz, Anthony Joseph

12 December 2007

Two standard invariants used to study the fundamental group of the complement X of a hyperplane arrangement are the Malcev completion of its fundamental group G and the cohomology groups of X with coefficients in rank one local systems. In this thesis, we develop a tool that unifies these two approaches. This tool is the Malcev completion S_p of G relative to a homomorphism p from G into (C^*)^N. The relative completion S_p is a prosolvable group that generalizes the classical Malcev completion; when p is the trivial representation, S_p is the Malcev completion of G. The group S_p is tightly controlled by the cohomology groups H^1(X,L_{p^k}) with coefficients in the irreducible local systems L_{p^k} associated to the representation p.The pronilpotent Lie algebra u_p of the prounipotent radical U_p of S_p has been described by Hain. If p is the trivial representation, then u_p is the holonomy Lie algebra, which is well-known to be quadratically presented. In contrast, we show that when X is the complement of the braid arrangement in complex two-space, there are infinitely many representations p from G into (C^*)^2 for which u_p is not quadratically presented.We show that if Y is a subtorus of the character torus T containing the trivial character, then S_p is combinatorially determined for general p in Y. We do not know whether S_p is always combinatorially determined. If S_p is combinatorially determined for all characters p of G, then the characteristic varieties of the arrangement X are combinatorially determined.When Y is an irreducible subvariety of T^N, we examine the behavior of S_p as p varies in Y. We define an affine group scheme S_Y over Y such that if Y = {p}, then S_Y is the relative Malcev completion S_p. For each p in Y, there is a canonical homomorphism of affine group schemes from S_p into the affine group scheme which is the restriction of S_Y to p. This is often an isomorphism. For example, if there exists p in Y whose image is Zariski dense in G_m^N, then this homomorphism is an isomorphism for general p in Y. / Dissertation

Mathematics

Malcev Completion

Hyperplane Arrangements

Characteristic Varieties

Orlik

Solomon Algebra

Rational Homotopy Theory

Iterated Integrals

On graded ideals over the exterior algebra with applications to hyperplane arrangements

Thieu, Dinh Phong

23 September 2013

Graded ideals over the polynomial ring are studied deeply with a huge of methods and results. Over the exterior algebra, there are not much known about the structures of minimal graded resolutions, Gröbner fans of graded ideals or the Koszul property of algebras defined by graded ideals. We study componentwise linearity, linear resolutions of graded ideals as well as universally, initially and strongly Koszul properties of graded algebras defined by a graded ideals over the exterior algebra. After that, we apply our results to Orlik-Solomon ideals of hyperplane arrangements and show in which way the exterior algebra is useful in the study of related combinatorial objects.

Exterior Algebra

Componentwise linear

Orlik-Solomon Algebra

Koszul algebras

31.20 - Algebra: Allgemeines

ddc:510

Module theory over the exterior algebra with applications to combinatorics

Kämpf, Gesa

17 May 2010

Diese Arbeit entwickelt aufbauend auf bekannten Resultaten die Modultheorie über der äußeren Algebra in Teilen weiter, insbesondere werden die Tiefe eines Moduls und Moduln mit linearer injektiver Auflösung untersucht. Angewendet werden die Resultate auf die Orlik-Solomon Algebra eines Matroids.

Exterior algebra

Orlik-Solomon algebra

face ring

Matroid

31.23 - Ideale, Ringe, Moduln, Algebren

31.12 - Kombinatorik, Graphentheorie

ddc:510

Analýza dopadů výstavby velkých vodních děl na příkladu Orlické přehrady / Impact analysis of large dam constuction with case study of Orlik water dam

Milaberská, Lucie

January 2015

This diploma thesis deals with the large water dams realization and their impact on the adjacent region and its development. The aim of thesis is to identify the most important effects associated with the construction of dams and analyze them. The theoretical part defines basic terms, categories of dams and the impacts of their construction, included the planning proces too. The problem is practically solved on the example of the Orlik Dam. The methods that has been used on this topic were literature review, data and available resources analysis and also there were used microhistorical approach. It can be assumed that dams have great impact on the surrounding environment, but the volume of the impact is always determined by many factors. Due to the amount of planned infrastructure projects is needed to pay extra attention for consequences of their realization considerable.

Firma Haase a výtvarné umění v 19. a raném 20. století / Haase Printing and Publishing Company and Fine Arts in the 19th and early 20th Century

Holečková, Kateřina

January 2022

The Prague based Haase printing and publishing company played an important role in the development of polygraphy, typography, significantly contributed to the Czech national revival and during its existence collaborated with many artists in some cases of world importance. This PhD thesis tries to bring knowledge to the applied graphic art in the Czech lands in general, but also describes the most important historical events of the Haase company, especially these with influence on its art production. The PhD thesis examines the process of graphic work creation and tries to place selected works in the context of work of individual authors and the fine art in the Central European area in general. It is also focused on the nationality issue and the role it played in the selection of artists with whom the Haase company collaborated.

The broken circuit complex and the Orlik - Terao algebra of a hyperplane arrangement

Le, Van Dinh

17 February 2016

My thesis is mostly concerned with algebraic and combinatorial aspects of the theory of hyperplane arrangements. More specifically, I study the Orlik-Terao algebra of a hyperplane arrangement and the broken circuit complex of a matroid. The Orlik-Terao algebra is a useful tool for studying hyperplane arrangements, especially for characterizing some non-combinatorial properties. The broken circuit complex, on the one hand, is closely related to the Orlik-Terao algebra, and on the other hand, plays a crucial role in the study of many combinatorial problem: the coefficients of the characteristic polynomial of a matroid are encoded in the f-vector of the broken circuit complex of the matroid. Among main results of the thesis are characterizations of the complete intersection and Gorenstein properties of the broken circuit complex and the Orlik-Terao algebra. I also study the h-vector of the broken circuit complex of a series-parallel network and relate certain entries of that vector to ear decompositions of the network. An application of the Orlik-Terao algebra in studying the relation space of a hyperplane arrangement is also included in the thesis.

Broken circuit complex

Hyperplane arrangement

Orlik - Terao algebra

h-vector

Relation space

Complete intersection

Gorenstein

Linear resolution

Series - parallel network

Matroid

31.12 - Kombinatorik, Graphentheorie

31.23 - Ideale, Ringe, Moduln, Algebren

ddc:510

Hodnocení přínosu z rekreačního využití okolí Orlické nádrže v souvislosti s jejím vyčištěním. / Evaluation of the contribution of the recreational use of the Orlik reservoir´s surronding in connection with its cleaning.

HANZLÍKOVÁ, Tereza

January 2014

The aim of the thesis is to evaluate the recreational potential of the Orlik dam in the event of a cleanup. The subject of research is the evaluation of recreational use through economic methods for valuing environmental goods and in terms of human factors. Based on the analysis of data collected as part of the verification - if cleaning the Orlik dam will bring greater economic benefits.