Algebraic topology studies topological spaces by means of algebraic invariants (groups, vector spaces, etc.), which allow us to reduce questions in topology to questions in algebra. Algebraic topology has many applications, both in theoretical and in applied mathematics. Nowadays, a basic knowledge of algebraic topology is essential in most other fields of pure mathematics, including analysis, algebraic geometry, and number theory. In applied mathematics, topological data analysis is a relatively new field that relies heavily on tools from algebraic topology.

In this first course on algebraic topology, we will study in depth two important invariants of a topological space: its fundamental group and its (co)homology groups. We will also see how to use these algebraic invariants to answer some interesting topological questions.

Topics covered in this course include:

• Covering spaces and the fundamental group
• Simplicial sets and singular (co)homology
• CW complexes and cellular (co)homology
• Miscellaneous applications (the fundamental theorem of algebra, Brouwer's fixed point theorem and invariance of domain, the hedgehog theorem, etc.)

This course is complemented by the seminar "de Rham cohomology". This seminar explores another approach to the cohomology of smooth manifolds via differential forms and proves Poincaré duality, which is a fundamental homological feature of smooth manifolds not shared by more general topological spaces.

• Registration for the exercise classes: via GRIPS in the first week of lecture period
• Registration for course work/examination/ECTS: FlexNow

• Successful participation in the exercise classes: 50% of points in the exercises, presentation
  of a solution in class

• Oral exam: Duration: 25 minutes, Date: first week after the lecture period, re-exam: Date: by
  appointment