The students who successfully complete the course will be familiar with fundamental notions of algebraic topology: homology, cohomology and homotopy groups of topological spaces and their applications.

They will be able to solve on their own simple problems in these fields and will have developed an intuitive vision of both theoretical and practical aspects of these topics. They will be able to provide proofs of the basic theoretical results seen in the lectures.

Ability to express correctly the definitions of the main objects and the statements of the theorems, together with application to simple examples. Solution of classical exercises with standard methods.

The homework problems will assess the ability of solving classical exercises realted to the course. The oral exam will assess the knowledge of the theory  and  of its applications to fundamental examples. 

The student must be able to discuss algebraic topology topics both with his/her mates and with the teacher using a rigorous mathematical language. 

During the oral examination, the committee evaluates the ability of the student in discussing algebraic topology topics with the teacher.