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21	Gelfand pairs Yakimova, Oksana, January 2005 (has links) Thesis (doctoral)--Rheinische Friedrich-Wilhelms-Universität Bonn, 2005. / Includes vita. Includes bibliographical references (p. 90-93).
22	The symmetric signature Caminata, Alessio 02 March 2016 (has links) We define two related invariants for a d-dimensional local ring (R,m,k) called syzygy and differential symmetric signature by looking at the maximal free splitting of reflexive symmetric powers of two modules: the top dimensional syzygy module of the residue field and the module of Kähler differentials of R over k. We compute these invariants for two-dimensional ADE singularities obtaining 1/\|G\|, where \|G\| is the order of the acting group, and for cones over elliptic curves obtaining 0 for the differential symmetric signature. These values coincide with the F-signature of such rings in positive characteristic. commutative algebra F-signature ddc:510
23	Topics in Combinatorial Algebra: Algorithms & Computations Sieg, Richard 13 September 2017 (has links) In this thesis we look at different topics and problems that combine the theory of combinatorics with the theory of (commutative) algebra. Mathematics Combinatorics Commutative Algebra ddc:510
24	Comparing invariants of toric ideals of bipartite graphs Bhaskara, Kieran January 2023 (has links) Given a finite simple graph G, one can associate to G an ideal I_G, called the toric ideal of G. There are a number of algebraic invariants of ideals which are frequently studied in commutative algebra. In general, understanding these invariants is very difficult for arbitrary ideals. However, when the ideals are related to combinatorial objects, in this case, graphs, a deeper investigation can be conducted. If, in addition, the graph G is bipartite, even more can be said about these invariants. In this thesis, we explore a comparison of invariants of toric ideals of bipartite graphs. Our main result describes all possible values for the tuple (reg(K[E]/I_G), deg(h_{K[E]/I_G}), pdim(K[E]/I_G), depth(K[E]/I_G), dim(K[E]/I_G)) when G is a bipartite graph on n ≥ 1 vertices. / Thesis / Master of Science (MSc) Mathematics Commutative algebra Combinatorics Graph theory
25	The group of automorphisms of non-associative commutative algebras associated with PSL(m,q), m>=3 / Narang, Kamal January 1985 (has links) No description available. Mathematics Commutative algebra Associative algebras Automorphisms
26	Simplicial Complexes of Placement Games Huntemann, Svenja 15 August 2013 (has links) Placement games are a subclass of combinatorial games which are played on graphs. In this thesis, we demonstrate that placement games could be considered as games played on simplicial complexes. These complexes are constructed using square-free monomials. We define new classes of placement games and the notion of Doppelgänger. To aid in exploring the simplicial complex of a game, we introduce the bipartite flip and develop tools to compare known bounds on simplicial complexes (such as the Kruskal-Katona bounds) with bounds on game complexes. Combinatorial Game Theory Commutative Algebra Combinatorial commutative algebra Combinatorics Simplicial Complex Placement Game
27	Valuations and Valuation Rings Badt, Sig H. 08 1900 (has links) This paper is an investigation of several basic properties of ordered Abelian groups, valuations, the relationship between valuation rings, valuations, and their value groups and valuation rings. The proofs to all theorems stated without proof can be found in Zariski and Samuel, Commutative Algebra, Vol. I, 1858. In Chapter I several basic theorems which are used in later proofs are stated without proof, and we prove several theorems on the structure of ordered Abelian groups, and the basic relationships between these groups, valuations, and their valuation rings in a field. In Chapter II we deal with valuation rings, and relate the structure of valuation rings to the structure of their value groups. valuation theory Valuation theory. Commutative rings. Commutative Algebra Abelian groups
28	Results on algebraic structures: A-algebras, semigroups and semigroup rings. / CUHK electronic theses & dissertations collection January 1998 (has links) by Chen Yuqun. / Thesis (Ph.D.)--Chinese University of Hong Kong, 1998. / Includes bibliographical references and index. / Electronic reproduction. Hong Kong : Chinese University of Hong Kong, [2012] System requirements: Adobe Acrobat Reader. Available via World Wide Web. / Mode of access: World Wide Web. / Abstracts in English and Chinese. Commutative rings Commutative algebra Semigroup rings Semigroup algebras
29	On the derivation module and apolar algebra of an arrangement of hyperplanes / Wakefield, Max, January 2006 (has links) Thesis (Ph. D.)--University of Oregon, 2006. / Typescript. Includes vita and abstract. Includes bibliographical references (leaves 83-84). Also available for download via the World Wide Web; free to University of Oregon users.
30	Moduli spaces of zero-dimensional geometric objects Lundkvist, Christian January 2009 (has links) The topic of this thesis is the study of moduli spaces of zero-dimensional geometricobjects. The thesis consists of three articles each focusing on a particular moduli space.The first article concerns the Hilbert scheme Hilb(X). This moduli space parametrizesclosed subschemes of a fixed ambient scheme X. It has been known implicitly for sometime that the Hilbert scheme does not behave well when the scheme X is not separated.The article shows that the separation hypothesis is necessary in the sense thatthe component Hilb1(X) of Hilb(X) parametrizing subschemes of dimension zero andlength 1 does not exist if X is not separated.Article number two deals with the Chow scheme Chow 0,n(X) parametrizing zerodimensionaleffective cycles of length n on the given scheme X. There is a relatedconstruction, the Symmetric product Symn(X), defined as the quotient of the n-foldproduct X ×. . .×X of X by the natural action of the symmetric group Sn permutingthe factors. There is a canonical map Symn(X) " Chow0,n(X) that, set-theoretically,maps a tuple (x1, . . . , xn) to the cycle!nk=1 xk. In many cases this canonical map is anisomorphism. We explore in this paper some examples where it is not an isomorphism.This will also lead to some results concerning the question whether the symmetricproduct commutes with base change.The third article is related to the Fulton-MacPherson compactification of the configurationspace of points. Here we begin by considering the configuration space F(X, n)parametrizing n-tuples of distinct ordered points on a smooth scheme X. The schemeF(X, n) has a compactification X[n] which is obtained from the product Xn by a sequenceof blowups. Thus X[n] is itself not defined as a moduli space, but the pointson the boundary of X[n] may be interpreted as geometric objects called stable degenerations.It is then natural to ask if X[n] can be defined as a moduli space of stabledegenerations instead of as a blowup. In the third article we begin work towards ananswer to this question in the case where X = P2. We define a very general modulistack Xpv2 parametrizing projective schemes whose structure sheaf has vanishing secondcohomology. We then use Artin’s criteria to show that this stack is algebraic. Onemay define a stack SDX,n of stable degenerations of X and the goal is then to provealgebraicity of the stack SDX,n by using Xpv2. / QC 20100729 Algebraic geometry Commutative algebra Moduli spaces Algebra and geometry Algebra och geometri

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