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51	Abelian Monoids Cooper, Dale Stephen 10 1900 (has links) <p> This thesis makes a small study of various kinds of submonoids of abelian monoids, of the lattice of submonoids of an abelian monoid, and of the concept of unique factorization in abelian monoids. Also, the main concepts in category theory are examined in the special case of the category of abelian monoids and some of its subcategories. </p> / Thesis / Master of Science (MSc)
52	On groups of ring multiplications / Hardy, F. Lane January 1962 (has links) No description available. Mathematics Abelian groups
53	Addition theorems in elementary Abelian groups / Olson, John Edward January 1967 (has links) No description available. Mathematics Abelian groups Addition
54	Quelques propriétés arithmétiques des corps de fonctions elliptiques Roy, Damien. January 1981 (has links) No description available. Abelian varieties. Elliptic functions.
55	On a unified categorical setting for homological diagram lemmas Michael Ifeanyi, Friday 12 1900 (has links) Thesis (MSc)--Stellenbosch University, 2011. / ENGLISH ABSTRACT: Some of the diagram lemmas of Homological Algebra, classically known for abelian categories, are not characteristic of the abelian context; this naturally leads to investigations of those non-abelian categories in which these diagram lemmas may hold. In this Thesis we attempt to bring together two different directions of such investigations; in particular, we unify the five lemma from the context of homological categories due to F. Borceux and D. Bourn, and the five lemma from the context of modular semi-exact categories in the sense of M. Grandis. / AFRIKAANSE OPSOMMING: Verskeie diagram lemmata van Homologiese Algebra is aanvanklik ontwikkel in die konteks van abelse kategorieë, maar geld meer algemeen as dit behoorlik geformuleer word. Dit lei op ’n natuurlike wyse na ’n ondersoek van ander kategorieë waar hierdie lemmas ook geld. In hierdie tesis bring ons twee moontlike rigtings van ondersoek saam. Dit maak dit vir ons moontlik om die vyf-lemma in die konteks van homologiese kategoieë, deur F. Borceux en D. Bourn, en vyflemma in die konteks van semi-eksakte kategorieë, in die sin van M. Grandis, te verenig. Non-abelian homological algebra Dissertations -- Mathematics Theses -- Mathematics Abelian categories
56	Non-existence of a stable homotopy category for p-complete abelian groups Vanderpool, Ruth, 1980- 06 1900 (has links) vii, 54 p. : ill. A print copy of this thesis is available through the UO Libraries. Search the library catalog for the location and call number. / We investigate the existence of a stable homotopy category (SHC) associated to the category of p -complete abelian groups [Special characters omitted]. First we examine [Special characters omitted] and prove [Special characters omitted] satisfies all but one of the axioms of an abelian category. The connections between an SHC and homology functors are then exploited to draw conclusions about possible SHC structures for [Special characters omitted]. In particular, let [Special characters omitted] denote the category whose objects are chain complexes of [Special characters omitted] and morphisms are chain homotopy classes of maps. We show that any homology functor from any subcategory of [Special characters omitted] containing the p-adic integers and satisfying the axioms of an SHC will not agree with standard homology on free, finitely generated (as modules over the p -adic integers) chain complexes. Explicit examples of common functors are included to highlight troubles that arrise when working with [Special characters omitted]. We make some first attempts at classifying small objects in [Special characters omitted]. / Committee in charge: Hal Sadofsky, Chairperson, Mathematics; Boris Botvinnik, Member, Mathematics; Daniel Dugger, Member, Mathematics; Sergey Yuzvinsky, Member, Mathematics; Elizabeth Reis, Outside Member, Womens and Gender Studies Stable homotopy P-complete abelian groups Homology functor Abelian Mathematics
57	On radical extensions and radical towers. Barrera Mora, Jose Felix Fernando. January 1989 (has links) Let K/F be a separable extension. (i) If K = F(α) with αⁿ ∈ F for some n, K/F is said to be a radical extension. (ii) If there exists a sequence of fields F = F₀ ⊆ F₁ ⊆ ... ⊆ F(s) = K so that Fᵢ₊₁ = Fᵢ(αᵢ) with αᵢⁿ⁽ⁱ⁾ ∈ Fᵢ for some nᵢ ∈ N, charF ∧nᵢ for every i, and [Fᵢ₊₁ : Fᵢ] = nᵢ, K/F is said to be a radical tower. In the first part of this work, we present two theorems which give sufficient conditions for a field extension K/F to be radical. In the second part, we present results which provide conditions under which every subfield of a radical tower is also a radical tower. Field extensions (Mathematics) Abelian groups.
58	Finite groups and coverings of surfaces Kazaz, Mustafa January 1997 (has links) No description available. 510 Abelian coverings; Action on homology
59	Magnetic monopoles and confinement in lattice gauge theory Hart, A. January 1996 (has links) No description available. 539.72
60	From multisets to matrix groups : some algorithms related to the exterior square Greenhill, Catherine January 1996 (has links) No description available. 510 Polynomials; Abelian group elements

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