TY - GEN AU - Asaoka, Masayuki. AU - Alaoui,Aziz El Kacimi AU - Hurder,Steven AU - Richardson,Ken AU - Lopez,Jesus Alvarez AU - Nicolau,Marcel TI - Foliations : : dynamics, geometry and topology T2 - Advanced courses in mathematics, CRM Barcelona SN - 9783034808705 U1 - 514.72 23 PY - 2014/// CY - Basel PB - Birkhauser KW - Foliations (Mathematics) N1 - Includes bibliographical references; 1. Deformation of locally free actions and leafwise cohomology / Masayuki Asaoka -- 2. Fundaments of foliation theory / Aziz El Kacimi Alaoui -- 3. Lectures on foliation dynamics / Steven Hurder -- 4. Transversal Dirac operators on distributions, foliations, and G-manifolds / Ken Richardson-- Bibliography N2 - This book is an introduction to several active research topics in Foliation Theory and its connections with other areas. It contains expository lectures showing the diversity of ideas and methods arising and used in the study of foliations. The lectures by A. El Kacimi Alaoui offer an introduction to Foliation Theory, with emphasis on examples and transverse structures. S. Hurder's lectures apply ideas from smooth dynamical systems to develop useful concepts in the study of foliations, like limit sets and cycles for leaves, leafwise geodesic flow, transverse exponents, stable manifolds, Pesin Theory, and hyperbolic, parabolic, and elliptic types of foliations, all of them illustrated with examples. The lectures by M. Asaoka are devoted to the computation of the leafwise cohomology of orbit foliations given by locally free actions of certain Lie groups, and its application to the description of the deformation of those actions. In the lectures by K. Richardson, he studies the geometric and analytic properties of transverse Dirac operators for Riemannian foliations and compact Lie group actions, and explains a recently proved index formula. Besides students and researchers of Foliation Theory, this book will appeal to mathematicians interested in the applications to foliations of subjects like topology of manifolds, dynamics, cohomology or global analysis. ER -