Found 6 relevant results in 1.26s where lecturer="Peter Feller"
Introduction to differential and integral calculus in multiple variables.
A seminar based on 'Proofs from the BOOK', a collection of beautiful arguments curated by Aigner and Ziegler inspired by an idea of Erdös.
Topics covered include: topological spaces, continuity, connectedness, compactness, product spaces, separation axioms, quotient spaces, homotopy, fundamental group, covering spaces.
Topics covered include: Topological and metric spaces, continuity, connectedness, compactness, product spaces, separation axioms, quotient spaces, homotopy, fundamental group, covering spaces.
The seminar consists of student presentations on topics from ''A Singular Mathematical Promenade'' written by Étienne Ghys.
This will be an introduction to geometric topology, a field of mathematics concerned with topological properties of manifolds. We will study both topological and smooth manifolds, and prove some fundamental results about them (like the Schoenflies theorem, the generalised Poincaré conjecture, the existence of exotic smooth structures), several of which have been awarded with Fields medals.