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1	Modules over ZG, G a non-abelian group of order pq Klingler, Lee Charles. January 1984 (has links) Thesis (Ph. D.)--University of Wisconsin--Madison, 1984. / Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references (leaves 180-181). Non-Abelian groups.
2	Descriptive aspects of torsion-free Abelian groups Coskey, Samuel Gregory. January 2008 (has links) Thesis (Ph. D.)--Rutgers University, 2008. / "Graduate Program in Mathematics." Includes bibliographical references (p. 73-74).
3	L#kappa#-equivalence and Hanf functions for finite structures Barker, Russell January 2002 (has links) No description available. 512 Abelian groups
4	Toeplitz Operators on Locally Compact Abelian Groups Gaebler, David 01 May 2004 (has links) Given a function (more generally, a measure) on a locally compact Abelian group, one can define the Toeplitz operators as certain integral transforms of functions on the dual group, where the kernel is the Fourier transform of the original function or measure. In the case of the unit circle, this corresponds to forming a matrix out of the Fourier coefficients in a particular way. We will study the asymptotic eigenvalue distributions of these Toeplitz operators. Toeplitz Operators Abelian Groups
5	Verifying Huppert's Conjecture for the simple groups of Lie type of rank two Wakefield, Thomas Philip. January 2008 (has links) Thesis (Ph.D.)--Kent State University, 2008. / Title from PDF t.p. (viewed Sept. 17, 2009). Advisor: Donald White. Keywords: Huppert's Conjecture; character degrees; nonabelian finite simple groups Includes bibliographical references (p. 103-105). Non-Abelian groups. Finite groups.
6	On rings with distinguished ideals and their modules Buckner, Joshua. Dugas, Manfred. January 2007 (has links) Thesis (Ph.D.)--Baylor University, 2007. / In abstract "s and z " are subscript. Includes bibliographical references (p. 54-55). Modules (Algebra) Abelian groups.
7	Generalizations of colorability and connectivity of graphs Zhang, Xiankun, January 1998 (has links) Thesis (Ph. D.)--West Virginia University, 1998. / Title from document title page. Document formatted into pages; contains vii, 97 p. : ill. Includes abstract. Includes bibliographical references (p. 93-96). Graph theory. Abelian groups.
8	Combinatorial problems on Abelian Cayley graphs / Couperus, Peter J., January 2005 (has links) Thesis (Ph. D.)--University of Washington, 2005. / Vita. Includes bibliographical references (p. 84-85). Cayley graphs. Abelian groups.
9	Über Abel'sche Körper deren alle Gruppeninvarianten aus einer Primzahl ℓ bestehen, und über Abel'sche Körper als Kreiskörper ... Värmon, John. January 1925 (has links) Thesis--Upsala. Invariants. Abelian groups.
10	Maximal abelian subalgebras of von Neumann algebras Nielsen, Ole A. January 1968 (has links) We are concerned with constructing examples of maximal abelian von Neumann subalgebras (MA subalgebras) in hyperfinite factors of type III. Our results will show that certain phenomena known to hold for the hyperfinite factor of type 11₁ also hold for type III factors. Let M and N be subalgebras of the factor α . We call M and N equivalent if M is the image of N by some automorphism of α . Let N(M) denote the subalgebra of α generated by all those unitary operators in α which induce automorphisms of M, and let N²(M), N³(M),... be defined in the obvious inductive fashion. Following J. Dixmier and S. Anastasio, we call a MA subalgebra M of α singular if N(M) = M, regular if N(M) = α, semi-regular if N(M) is a factor distinct from α, and m-semi-regular (m ≥ 2) if N(M),. . .N(m-1)(M) are not factors but N(m)(M) is a factor. The MA subalgebras of the hyperfinite 11₁ factor β have received much attention in the literature, in the papers of J. Dixmier, L. Pukanszky, Sister R. J. Tauer, and S. Anastasio. It is known that β contains a MA subalgebra of each type. Further, β contains pairwise inequivalent sequences of singular, semi-regular, 2-semi-regular, and 3-semi-regular MA subalgebras. The only hitherto known example of a MA subalgebra in a type III factor is regular. In 1956 Pukanszky gave a general method for constructing MA subalgebras in a class of (probably non-hyperfinite) type III factors. Because of an error in a calculation, the types of these subalgebras is not known. The main result of this thesis is the construction, in each of the uncountably many mutually non-isomorphic hyperfinite type III factors of R. Powers, of: (i) a semi-regular MA subalgebra (ii) two sequences of mutually inequivalent 2-semi-regular MA subalgebras 1 (iii) two sequences of mutually inequivalent 3-semi-regular MA subalgebras. Let α denote one of these type III factors and let β denote the hyperfinite 11₁ factor. Roughly speaking, whenever a non-singular MA subalgebra of β is constructed by means of group operator algebras, our method will produce a MA subalgebra of α of the same type. H. Araki and J. Woods have shown that α ⊗ β ≅ α, and it is therefore only necessary to construct MA subalgebras of α ⊗ β of the desired type. We obtain MA subalgebras of α ⊗ β by tensoring a MA subalgebra in α with one in β. In order to determine the type of such a MA subalgebra, we realize β as a constructible algebra and then regard α ⊗ β as a constructible algebra; this allows us to consider operators in α ⊗ β as functions from a group into an abelian von Neumann algebra. As a corollary to our calculations, we are able to construct mutually inequivalent sequences of 2-semi-regular and 3-semi-regular MA subalgebras of the hyperfinite 11₁ factor which differ from those of Anastasio. / Science, Faculty of / Mathematics, Department of / Graduate Rings (Algebra) Abelian groups

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