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La conjecture de Sullivan

Lionel Schwartz (1984/1985)

Séminaire Bourbaki

Lannes' T functor on Hopf algebras over the Steenrod algebra with applications to Carlsson modules and twisted algebras.

R. James Shank (1992)

Mathematische Zeitschrift

Le foncteur $V \mapsto 𝔽_{2} {[V]}^{\otimes 3}$ entre $𝔽_{2}$ -espaces vectoriels est noethérien

Aurélien Djament (2009)

Annales de l’institut Fourier

Les foncteurs entre espaces vectoriels, ou représentations génériques des groupes linéaires d’après Kuhn, interviennent en topologie algébrique et en $K$ -théorie comme en théorie des représentations. Nous présentons ici une nouvelle méthode pour aborder les problèmes de finitude et la dimension de Krull dans ce contexte.Plus précisément, nous démontrons que, dans la catégorie $ℱ$ des foncteurs entre espaces vectoriels sur $𝔽_{2}$ , le produit tensoriel entre $P^{\otimes 3}$ , où $P$ désigne le foncteur projectif $V \mapsto 𝔽_{2} [V]$ , et un foncteur...

Lectures on minimal models

S. Halperin (1983)

Mémoires de la Société Mathématique de France

Line bundles with $c_{1} {(L)}^{2} = 0$ . A six dimensional example

Stefano De Michelis (1991)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

We exhibit a six dimensional manifold with a line bundle on it which is not the pullback of a bundle on $S^{2}$ .

Line bundles with $c_{1} {(L)}^{2} = 0$ . Higher order obstruction

Stefano De Michelis (1991)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

We study secondary obstructions to representing a line bundle as the pull-back of a line bundle on $S^{2}$ and we interpret them geometrically.

Line Fields with Branch Defects.

Klaus Jänich (1984)

Manuscripta mathematica

Linking and coincidence invariants

Ulrich Koschorke (2004)

Fundamenta Mathematicae

Given a link map f into a manifold of the form Q = N × ℝ, when can it be deformed to an “unlinked” position (in some sense, e.g. where its components map to disjoint ℝ-levels)? Using the language of normal bordism theory as well as the path space approach of Hatcher and Quinn we define obstructions $ω ̃_{ε} (f)$ , ε = + or ε = -, which often answer this question completely and which, in addition, turn out to distinguish a great number of different link homotopy classes. In certain cases they even allow a complete...

Displaying 1 – 13 of 13

La conjecture de Sullivan

Lannes' T functor on Hopf algebras over the Steenrod algebra with applications to Carlsson modules and twisted algebras.

Le foncteur $V \mapsto 𝔽_{2} {[V]}^{\otimes 3}$ entre $𝔽_{2}$ -espaces vectoriels est noethérien

Lectures on minimal models

Line bundles with $c_{1} {(L)}^{2} = 0$ . A six dimensional example

Line bundles with $c_{1} {(L)}^{2} = 0$ . Higher order obstruction

Line Fields with Branch Defects.

Linking and coincidence invariants

Linking first occurrence polynomials over $𝔽_{p}$ by Steenrod operations.

Localisation of Unstable Ap-Algebras and Smith Theory.

Localization, Completion and detecting equivariant maps on Skeletons.

Localization of Fibrations with Nilpotent Fibre.

Localizations of unstable A-modules and equivariant mod p cohomology.

Currently displaying 1 – 13 of 13