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1	Fibrations de Lefschetz Réelles Salepci, Nermin 19 October 2007 (has links) (PDF) Nous étudions les fibrations de Lefschetz réelles. Nous présentons des invariants de fibrations de Lefschetz réelles au dessus de $D^2$ ou $S^2$ n'ayant que des valeurs critiques réelles. Dans le cas où le genre des fibres est égal à 1, nous obtenons un objet combinatoire, appelé le diagramme de collier. En utilisant les diagrammes de collier nous obtenons une classification des fibrations de Lefschetz réelles de genre 1 admettant une section réelle et dont toutes les valeurs critiques sont réelles. On définit les diagrammes de collier raffinés pour les fibrations qui n'admettent pas de section réelle. Grâce aux diagrammes de collier, nous observons l'existence de quelques exemples intéressants. [MATH] Mathematics Fibrations de Lefschetz structure réelle fibrations de Lefschetz réelles monodromie diagrammes de collier
2	Real Lefschetz Fibrations Salepci, Nermin 01 October 2007 (has links) (PDF) In this thesis, we present real Lefschetz fibrations. We first study real Lefschetz fibrations around a real singular fiber. We obtain a classification of real Lefschetz fibrations around a real singular fiber by a study of monodromy properties of real Lefschetz fibrations. Using this classification, we obtain some invariants, called real Lefschetz chains, of real Lefschetz fibrations which admit only real critical values. We show that in case the fiber genus is greater then 1, the real Lefschetz chains are complete invariants of directed real Lefschetz fibrations with only real critical values. If the genus is 1, we obtain complete invariants by decorating real Lefschetz chains. For elliptic Lefschetz fibrations we define a combinatorial object which we call necklace diagrams. Using necklace diagrams we obtain a classification of directed elliptic real Lefschetz fibrations which admit a real section and which have only real critical values. We obtain 25 real Lefschetz fibrations which admit a real section and which have 12 critical values all of which are real. We show that among 25 real Lefschetz fibrations, 8 of them are not algebraic. Moreover, using necklace diagrams we show the existence of real elliptic Lefschetz fibrations which can not be written as the fiber sum of two real elliptic Lefschetz fibrations. We define refined necklace diagrams for real elliptic Lefschetz fibrations without a real section and show that refined necklace diagrams classify real elliptic Lefschetz fibrations which have only real critical values. QA Topology 611-614
3	A Lefschetz fixed point formula in the relative elliptic theory Schulze, Bert-Wolfgang, Tarkhanov, Nikolai N. January 1998 (has links) A version of the classical Lefschetz fixed point formula is proved for the cohomology of the cone of a cochain mapping of elliptic complexes. As a particular case we show a Lefschetz formula for the relative de Rham cohomology. elliptic complexes relative cohomology Lefschetz number Mathematics
4	The Lefschetz number of sequences of trace class curvature Tarkhanov, Nikolai, Wallenta, Daniel January 2012 (has links) For a sequence of Hilbert spaces and continuous linear operators the curvature is defined to be the composition of any two consecutive operators. This is modeled on the de Rham resolution of a connection on a module over an algebra. Of particular interest are those sequences for which the curvature is "small" at each step, e.g., belongs to a fixed operator ideal. In this context we elaborate the theory of Fredholm sequences and show how to introduce the Lefschetz number. Perturbed complexes curvature Lefschetz number Mathematics
5	The universal functorial equivariant Lefschetz invariant Weber, Julia. Unknown Date (has links) (PDF) University, Diss., 2005--Münster (Westfalen).
6	O número de Lefschetz e teoremas do tipo Borsuk-Ulam Trinca, Cibele Cristina [UNESP] 21 March 2007 (has links) (PDF) Made available in DSpace on 2014-06-11T19:26:15Z (GMT). No. of bitstreams: 0 Previous issue date: 2007-03-21Bitstream added on 2014-06-13T20:26:59Z : No. of bitstreams: 1 trinca_cc_me_sjrp.pdf: 385971 bytes, checksum: f33970449a23cc2073a2912a75704466 (MD5) / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES) / Neste trabalho, estudamos o Teorema clássico de Borsuk - Ulam e também outros Teoremas do tipo Borsuk - Ulam. Para isto, consideramos aplicacões contínuas f : (Cn+1 L f0g) ! Cn. Uma raíz primitiva k - ésima da unidade » nos fornece uma Zk-acão livre sobre Cn. Um teorema nos diz que a equação kL1X i=0 »if(»ix) = 0 sempre tem uma solução x 2 (Cn+1 L f0g). Este resultado produz várias aplicações. Por exemplo, se p é um número primo, f : Sn ! Rr uma aplicacão contínua, com n > r(p L 1), então alguma órbita da Zp-ação deve ser aplicada em um ponto. / In this work, we study the Classical Borsuk-Ulam Theorem and also other Borsuk- Ulam Theorems. For that, we consider continuous maps f : (Cn+1 L f0g) ! Cn. A primitive k-root of unity » gives rise to a free Zk-action on Cn. A result states that the equation kL i=0 »if(»ix) = 0 always has a solution x 2 (Cn+1 L f0g). This result provides several aplications. For example, if p is a prime number, f : Sn ! Rr a continuous map and n > r(p L 1), then some orbit of the Zp-action must be mapped into a point. Topologia algebrica Borsuk-Ulam, Teorema de Lefschetz, Número de Lefschetz number Borsuk-Ulam's theorem
7	O teorema de Lefschetz-Hopf e sua relação com outros teoremas clássicos da topologia Galves, Ana Paula Tremura [UNESP] 27 February 2009 (has links) (PDF) Made available in DSpace on 2014-06-11T19:26:55Z (GMT). No. of bitstreams: 0 Previous issue date: 2009-02-27Bitstream added on 2014-06-13T18:30:54Z : No. of bitstreams: 1 galves_apt_me_sjrp.pdf: 719114 bytes, checksum: 3cc285d329c0d629cf2c6ff65c13a201 (MD5) / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES) / Em Topologia, mais especificamente em Topologia Algébrica, temos alguns resultados clássicos que de alguma forma estão relacionados. No desenvolvimento deste trabalho, estudamos alguns desses resultados, a saber: Teorema de Lefschetz-Hopf, Teorema do Ponto Fixo de Lefschetz, Teorema do Ponto Fixo de Brouwer, Teorema da Curva de Jordan e o Teorema Clássico de Borsuk-Ulam. Além disso, tivemos como objetivo principal mostrar relações existentes entre esses teoremas a partir do Teorema de Lefschetz-Hopf. / In Topology, more specifically in Algebraic Topology, we have some classical results that are in some way related. In developing this work, we studied some of these results, namely the Lefschetz-Hopf Theorem, the Lefschetz Fixed Point Theorem, the Brouwer Fixed Point Theorem, the Jordan Curve Theorem and the Classic Borsuk-Ulam Theorem. Moreover, our main objective was to show relationships among those theorems by using Lefschetz-Hopf Theorem. Topologia algebrica Teoria de pontos fixos Índice de pontos fixos Lefschetz-Hopf, Número de Lefschetz-Hopf, Teorema de Algebraic topology Fixed points Fixed point index Borsuk-Ulam's theorem Lefschetz-Hopf Theorem
8	Vector Bundles Over Hypersurfaces Of Projective Varieties Tripathi, Amit 07 1900 (has links) (PDF) In this thesis we study some questions related to vector bundles over hypersurfaces. More precisely, for hypersurfaces of dimension ≥ 2, we study the extension problem of vector bundles. We find some cohomological conditions under which a vector bundle over an ample divisor of non-singular projective variety, extends as a vector bundle to an open set containing that ample divisor. Our method is to follow the general Groethendieck-Lefschetz theory by showing that a vector bundle extension exists over various thickenings of the ample divisor. For vector bundles of rank > 1, we find two separate cohomological conditions on vector bundles which shows the extension to an open set containing the ample divisor. For the case of line bundles, our method unifies and recovers the generalized Noether-Lefschetz theorems by Joshi and Ravindra-Srinivas. In the last part of the thesis, we make a specific study of vector bundles over elliptic curve. Hypersurfaces Vector Bundles Vector Bundle Extensions Vector Bundle Extension Theorem Noether-Lefschetz Theorem Vector Bundles on Ellipitic Curves Grothendieck-Lefschetz Theory Grothendieck-Lefschetz Theorem Topology
9	Broken Lefschetz fibrations on smooth four-manifolds Williams, Jonathan Dunklin 12 October 2010 (has links) It is known that an arbitrary smooth, oriented four-manifold admits the structure of what is called a broken Lefschetz fibration. Given a broken Lefschetz fibration, there are certain modifications, realized as homotopies of the fibration map, that enable one to construct infinitely many distinct fibrations of the same manifold. The aim of this paper is to prove that these modifications are sufficient to obtain every broken Lefschetz fibration in a given homotopy class of smooth maps. One notable application is that adding an additional projection move generates all broken Lefschetz fibrations, regardless of homotopy class. The paper ends with further applications and open problems. / text Manifold 4-manifold topology Lefschetz fibration Broken Symplectic Smooth singularity
10	A Lefschetz fixed point formula for elliptic quasicomplexes Wallenta, Daniel January 2013 (has links) In a recent paper with N. Tarkhanov, the Lefschetz number for endomorphisms (modulo trace class operators) of sequences of trace class curvature was introduced. We show that this is a well defined, canonical extension of the classical Lefschetz number and establish the homotopy invariance of this number. Moreover, we apply the results to show that the Lefschetz fixed point formula holds for geometric quasiendomorphisms of elliptic quasicomplexes. Perturbed complexes curvature Lefschetz number fixed point formula Mathematics

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