PUMA publications for /tag/topologyhttp://puma.uni-kassel.de/tag/topologyPUMA RSS feed for /tag/topology2017-09-26T18:30:52+02:00Algebraic topologyhttp://puma.uni-kassel.de/bibtex/23e2209892f705f1dbfa5242f96095866/00983870009838702017-09-12T08:57:10+02:00topology future <span class="authorEditorList"><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Tammo Tom Dieck" itemprop="url" href="/author/Tammo%20Tom%20Dieck"><span itemprop="name">T. Tom Dieck</span></a></span>. </span><em>EMS textbooks in mathematics </em><em><span itemprop="publisher">Europ. Math. Soc.</span>, </em><em>Zürich, </em>(<em><span>2008<meta content="2008" itemprop="datePublished"/></span></em>)Tue Sep 12 08:57:10 CEST 2017ZürichEMS textbooks in mathematicsAlgebraic topology2008topology future This book is written as a textbook on algebraic topology. The first part covers the material for two introductory courses about homotopy and homology. The second part presents more advanced applications and concepts (duality, characteristic classes, homotopy groups of spheres, bordism). The author recommends starting an introductory course with homotopy theory. For this purpose, classical results are presented with new elementary proofs. Alternatively, one could start more traditionally with singular and axiomatic homology. Additional chapters are devoted to the geometry of manifolds, cell complexes and fibre bundles. A special feature is the rich supply of nearly 500 exercises and problems. Several sections include topics which have not appeared before in textbooks as well as simplified proofs for some important results. Prerequisites are standard point set topology (as recalled in the first chapter), elementary algebraic notions (modules, tensor product), and some terminology from category theory. The aim of the book is to introduce advanced undergraduate and graduate (master's) students to basic tools, concepts and results of algebraic topology. Sufficient background material from geometry and algebra is included. Summary hebis