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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
1

Über die Rechtsderivierten des inversen Limes von Modul-und Gruppenfamilien

Brandenburg, Jürgen. January 1967 (has links)
Issued also as thesis, Bonn. / Added t.p. with thesis statement. Includes bibliographical references (p. 62-63).
2

Über die Rechtsderivierten des inversen Limes von Modul-und Gruppenfamilien

Brandenburg, Jürgen. January 1967 (has links)
Issued also as thesis, Bonn. / Added t.p. with thesis statement. Includes bibliographical references (p. 62-63).
3

LOT complexes and the Whitehead conjecture /

Kelm, Travis R., January 2002 (has links)
Thesis (Ph. D.)--University of Oregon, 2002. / Typescript. Includes vita and abstract. Includes bibliographical references (leaves 71-73). Also available for download via the World Wide Web; free to University of Oregon users.
4

Zur Untermodulstruktur der Weylmoduln für Sl₃

Kühne-Hausmann, Kerstin. January 1985 (has links)
Thesis (doctoral)--Rheinischen Friedrich-Wilhelms-Universität, Bonn, 1985.
5

Hurewicz homomorphisms

Lê, Anh-Chi’ January 1974 (has links)
Theorem : Let X be simply connected . H[sub q](X) be finitely generated for each q. π[sub q](X) be finite for each q < n. n>> 1. Then , H[sub q] , π[sub q](X) --> H[sub q](X) has finite kernel for q < 2n has finite cokernel for q < 2n+l ker h[sub 2n+1] Q = ker u where , u is the cup product or the square free cup product on R[sup n+1](x) depending on whether n+1 is even or odd , respectively . ( R[sup N+1](X) is a quotient group of H[sub Q][sup n+1](x) to be defined in this thesis ) / Science, Faculty of / Mathematics, Department of / Graduate
6

Cohomology of compactifications of moduli spaces of stable bundles over a Riemann surface

Hatter, Luke January 1997 (has links)
No description available.
7

Equivariant Lusternik-Schnirelmann category

Shaw, Edmund January 1991 (has links)
No description available.
8

Towers, modules and Moore spaces in proper homotopy theory

Beattie, Malcolm I. C. January 1993 (has links)
No description available.
9

Realização de conjunto de pontos fixos numa dada classe de homotopia equivariante de aplicações / Realization of xed point set in a prescribed equivariant homotopy class of maps.

Souza, Rafael Moreira de 29 May 2014 (has links)
Nesse trabalho combinamos a teoria de Nielsen de pontos fixos com a teoria dos grupos de transformações para dar condições necessárias e sucientes para realizar um subconjunto A localmente contrátil de X G - como o conjunto de pontos xos de uma apli- h : X X em uma classe de homotopia equivariante dada, onde G é X é uma G -variedade suave e compacta. Além disso, se X é o espaço total de um G -brado localmente trivial demos condições cação equivariante um grupo de Lie compacto e necessárias e sucientes para o correspondente problema de realização para aplicações G -equivariantes que preservam bra, onde G é um grupo nito. / In this work, we combine the Nielsen fixed point theory with the transformation group theory to present necessary and sucient conditions for the realization of a locally contrac- G -subset A of X as the xed point set of a map h : X X in a given G -homotopy class. Here, G is a compact Lie group and X is a compact smooth G -manifold. In adition, if X is the total space of a G -ber bundle we present necessary and sucient conditions for the corresponding realization problem for G -ber-preserving maps when G tible is a nite group.
10

Periodic Margolis Self Maps at p=2

Merrill, Leanne 10 April 2018 (has links)
The Periodicity theorem of Hopkins and Smith tells us that any finite spectrum supports a $v_n$-map for some $n$. We are interested in finding finite $2$-local spectra that both support a $v_2$-map with a low power of $v_2$ and have few cells. Following the process outlined in Palmieri-Sadofsky, we study a related class of self-maps, known as $u_2$-maps, between stably finite spectra. We construct examples of spectra that might be expected to support $u_2^1$-maps, and then we use Margolis homology and homological algebra computations to show that they do not support $u_2^1$-maps. We also show that one example does not support a $u_2^2$-map. The nonexistence of $u_2$-maps on these spectra eliminates certain examples from consideration by this technique.

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