Coisotropic characteristic classes

This is the reason why we developed a web-based companion browser, RxClass, which supports navigation between RxNorm drugs and drug classes from several sources, including ATC,

In fact it enables us to prove a topological version ofEarle's embedding theorem [E]([Mo6]), to construct canonical group cocycles for the characteristic classes of sur- face

COROLLARY 3.8. — 1) Lemma 3.6 implies that vF^i has a foliated vector bundle structure with respect to F^ defined by considering the horizontal lift of F^ with respect to a

Within the general context of this study, the following problem appears in a canonical way : let M be a differentiable manifold on which two foliations F^ and F^ are defined, and

Bounded cohomology, classifying spaces, flat bundles, Lie groups, subgroup distortion, stable commutator length, word metrics.. The authors are grateful to the ETH Z¨ urich, the MSRI

In conjunction with [8], these observations give rise to the following Borsuk-Ulam problem: given compact surfaces M and N without boundary and a free involution τ : M → M ,

According to [5, Theorem 7], the pointed homotopy class α has the Borsuk-Ulam property with respect to the free involution τ 1 if and only if the homotopy class β has the

— The idea of the proof is to transfer the computation of the characteristic classes of a tensor product of flat bundles to a computation in the cohomology of the linear group.. Let