Representations of palindromically presented groups onto finite subgroups of
Representations of polygons of finite groups.
Representations of the group of smooth mappings of a manifold X into a compact Lie group
Representations of the Kauffman bracket skein algebra of the punctured torus
We describe the action of the Kauffman bracket skein algebra on some vector spaces that arise as relative Kauffman bracket skein modules of tangles in the punctured torus. We show how this action determines the Reshetikhin-Turaev representation of the punctured torus. We rephrase our results to describe the quantum group quantization of the moduli space of flat SU(2)-connections on the punctured torus with fixed trace of the holonomy around the boundary.
Representations of the Whitehead manifold and Julia sets
Representing 3-manifolds by triangulations of . I: A constructive approach.
Representing Countable Groups by Homeomorphism Groups in Hilbert Space.
Representing open 3-manifolds as 3-fold branched coverings.
It is proved that the Freudenthal compactification of an open, connected, oriented 3-manifold is a 3-fold branched covering of S3, and in some cases, a 2-fold branched covering of S3. The branching set is a locally finite disjoint union of strings.
Reshetikhin-Turaev invariants of Seifert 3-manifolds and a rational surgery formula.
Residual Finiteness of Surface Groups via Tessellations.
Residual sets not of maximum dimension
Residues for monogenic forms on Riemannian manifolds
The paper extends the theory of residues on monogenic forms on domains in (monogenic forms are generalizations of holomorphic forms to Clifford analysis) to monogenic forms on orientable Riemann manifolds.
Residues of singular holomorphic foliations
Résidus des connexions à singularités et classes caractéristiques
Un “théorème des résidus” est donné, qui exprime les classes caractéristiques réelles de dimension d’un fibré principal à l’aide d’une connexion définie seulement au-dessus d’un voisinage du -squelette d’une triangulation de la base. Ce théorème coiffe simultanément la théorie de Chern-Weil, la théorie de l’obstruction modulo torsion, ainsi que des formules du type Riemann-Hurwitz pour les revêtements ramifiés.
Résidus des sous-variétés invariantes d'un feuilletage singulier
Une formule de résidus est demontrée pour les classes caractéristiques de degré suffisamment grand du fibré normal à une sous variété lisse d’une variété , invariante relativement à un feuilletage avec singularités dans . En particulier, dans le cas analytique complexe, et pour les feuilletages dont les feuilles sont de dimension complexe 1, les nombres de Chern du fibre normal à la sous-variété sont calculés en termes de résidus de Grothendieck, par une formule qui généralise au cas de dimensions...
Resolutions of Homology Manifolds, and the Topological Characterization of Manifolds.
Resolutions of moduli spaces and homological stability
We describe partial semi-simplicial resolutions of moduli spaces of surfaces with tangential structure. This allows us to prove a homological stability theorem for these moduli spaces, which often improves the known stability ranges and gives explicit stability ranges in many new cases. In each of these cases the stable homology can be identified using the methods of Galatius, Madsen, Tillmann and Weiss.
Restriction Theorems for Stable Rank 3 Vector Bundles on IPn .
Resultados de F. Cano sobre una conjetura de Thom.
Resurgence of the Kontsevich-Zagier series
The paper is concerned with the resurgence of the Kontsevich-Zagier seriesWe give an explicit formula for the Borel transform of the power series when from which its analytic continuation, its singularities (all on the positive real axis) and the local monodromy can be manifestly determined. We also give two formulas (one involving the Dedekind eta function, and another involving the complex error function) for the right, left and median summation of the Borel transform. We also prove that the...