02765nam a22003615a 4500001001100000003001200011005001700023006001900040007001500059008004100074020001800115024002100133040001400154072001600168084002200184245008800206260008200294300003400376336002600410337002600436338003600462347002400498490008300522505062000605506006601225520090401291650002102195650001802216650003802234700003702272856003202309856006202341145-120118CH-001817-320120118234510.0a fot ||| 0|cr nn mmmmamaa120118e20120118sz fot ||| 0|eng d a978303719605270a10.4171/1052doi ach0018173 7aPBM2bicssc a51-xxa57-xx2msc10aStrasbourg Master Class on Geometryh[electronic resource] /cAthanase Papadopoulos3 aZuerich, Switzerland :bEuropean Mathematical Society Publishing House,c2012 a1 online resource (461 pages) atextbtxt2rdacontent acomputerbc2rdamedia aonline resourcebcr2rdacarrier atext filebPDF2rda0 aIRMA Lectures in Mathematics and Theoretical Physics (IRMA) ;x2523-5133 ;v1800tNotes on non-Euclidean geometry /rNorbert A’Campo, Athanase Papadopoulos --tCrossroads between hyperbolic geometry and number theory /rFrançoise Dal’Bo --tIntroduction to origamis in Teichmüller space /rFrank Herrlich --tFive lectures on 3-manifold topology /rPhilipp Korablev, Sergey V. Matveev --tAn introduction to globally symmetric spaces /rGabriele Link --tGeometry of the representation spaces in SU(2) /rJulien Marché --tAlgorithmic construction and recognition of hyperbolic 3-manifolds, links, and graphs /rCarlo Petronio --tAn introduction to asymptotic geometry /rViktor Schroeder.1 aRestricted to subscribers:uhttps://www.ems-ph.org/ebooks.php aThis book contains carefully revised and expanded versions of eight courses that were presented at the University of Strasbourg, during two geometry master classes, in 2008 and 2009. The aim of the master classes was to give to fifth-year students and PhD students in mathematics the opportunity to learn new topics that lead directly to the current research in geometry and topology. The courses were held by leading experts. The subjects treated include hyperbolic geometry, three-manifold topology, representation theory of fundamental groups of surfaces and of three-manifolds, dynamics on the hyperbolic plane with applications to number theory, Riemann surfaces, Teichmüller theory, Lie groups and asymptotic geometry.
The text is addressed to students and mathematicians who wish to learn the subject. It can also be used as a reference book and as a textbook for short courses on geometry.07aGeometry2bicssc07aGeometry2msc07aManifolds and cell complexes2msc1 aPapadopoulos, Athanase,eeditor.40uhttps://doi.org/10.4171/105423cover imageuhttps://www.ems-ph.org/img/books/irma_18.jpg