Classification des variétés différentiables, -connexes, sans torsion, de dimension
Classification of compact complex homogeneous spaces with invariant volumes.
Classification of compact homogeneous spaces with invariant symplectic structures.
Classification of CR invariant structures for compact Lie groups. (Classification des structures CR invariantes pour les groupes de Lie compacts.)
Classification of dodecahedral space forms.
Classification of free actions by some metacyclic groups on
Classification of function spaces with the pointwise topology determined by a countable dense set
Classification of homotopy Dold manifolds.
Classification of Nash manifolds
A semi-algebraic analytic manifold and a semi-algebraic analytic map are called a Nash manifold and a Nash map respectively. We clarify the category of Nash manifolds and Nash maps.
Classification of overtwisted contact structures on 3-manifolds.
Classification of riemannian flows with transverse similarity structures
Classification of -cubes in the dimension
Classification of simple knots by Levine pairings.
Classification of singularities with compact abelian symmetry
Classification problems in low-dimensional topology
Classification topologique des germes de formes logarithmiques génériques
On établit la classification topologique des feuilletages holomorphes de codimension 1 singuliers à l’origine de , admettant une intégrale première multiforme du type .
Classifying finite-sheeted covering mappings of paracompact spaces.
The main result of the present paper is a classification theorem for finite-sheeted covering mappings over connected paracompact spaces. This theorem is a generalization of the classical classification theorem for covering mappings over a connected locally pathwise connected semi-locally 1-connected space in the finite-sheeted case. To achieve the result we use the classification theorem for overlay structures which was recently proved by S. Mardesic and V. Matijevic (Theorems 1 and 4 of [5]).
Classifying toposes and foliations
For any etale topological groupoid (for example, the holonomy groupoid of a foliation), it is shown that its classifying topos is homotopy equivalent to its classifying space. As an application, we prove that the fundamental group of Haefliger for the (leaf space of) a foliation agrees with the one introduced by Van Est. We also give a new proof of Segal’s theorem on Haefliger’s classifying space .
Clifford algebra with Reduce
Climbing a Legendrian mountain range without stabilization
We introduce a new braid-theoretic framework with which to understand the Legendrian and transversal classification of knots, namely a Legendrian Markov Theorem without Stabilization which induces an associated transversal Markov Theorem without Stabilization. We establish the existence of a nontrivial knot-type specific Legendrian and transversal MTWS by enhancing the Legendrian mountain range for the (2,3)-cable of a (2,3)-torus knot provided by Etnyre and Honda, and showing that elementary negative...