OVERVIEW

The course is addressed at second year students and aims at providing some basic notions of Algebraic Topology and Differential Geometry.

AIMS AND CONTENT

LEARNING OUTCOMES

The course, introduced in Algebra Topology, aims to describe the first elements of the theory of homotopy, with the aim of defining the fundamental group of a topological space and calculating it in a few simple examples.

AIMS AND LEARNING OUTCOMES

The course aims at providing the necessary theoretical and operative knowledge for the understanding and solving of the problems in the following topics: tolopological surfaces and their classification, notions of cathegory theory and functors, homotopy classes of functions and topological spaces, fundamental groups of topological spaces, study and characterisation of a parametrised curve in R^n, study and characterisation of a surface in R^3.
At the end of the course the student will be able to recall and present the theoretical notions she will have faced during the lectures. Moreover, by applying the algorithms and the solving technique introducted in the course and justifying every step, she will be able to:
- classify a topological surface from a given polygon representing it;
- compute the fundamental group of a given topological space;
- distinguish different topological spaces by means of suitable invariants;
- study and characterise a parametrised curve in R^n, with particular focus on curves in R^3;
- study and characterise a regular surface in R^3, also by means of gaussian curvature, sectional curvatura, geodesics.

PREREQUISITES

Notions of linear algebra and analytic geometry. Notions of general topology. Notions of differential calculus (partial derivatives, integrals).

TEACHING METHODS

Theoretical lectures and exercises sessions

SYLLABUS/CONTENT

The following topics will be dealt with from both a theorical and operative point of view.
Classifications of topological surfaces.
Notions of cathegory theory and functors.
Homotopy classes of functions and topological spaces.
Fundamental groups.
Seifert-Van Kampen Theorem.
Curves in R^n and R^3: curvature, torsion, Frenet-Serret frame.
Regular surfaces in R^3: fundamental forms, Gauss map, curvatures, Theorema Egregium.

Gauss-Bonnet Theorem might also be mentioned.

RECOMMENDED READING/BIBLIOGRAPHY

1. Manetti, Topologia.
2. do Carmo, Differential Geometry of Curves and Surfaces.
3. Kosniowski, Introduzione alla topologia algebrica.
4. Massey: A basic Course in Algebraic Topology.
5. Abate, Tovena, Curve e superfici.
Other books or notes may be added during the semester.

TEACHERS AND EXAM BOARD

Exam Board

FABIO TANTURRI (President)

MATTEO PENEGINI

ARVID PEREGO (President Substitute)

ELEONORA ANNA ROMANO (President Substitute)

LESSONS

LESSONS START

From February 17th 2025, according to here 

Class schedule

The timetable for this course is available here: Portale EasyAcademy

EXAMS

EXAM DESCRIPTION

Written exam followed by an oral exam. The outcome of the written part is the starting point of the final evaluation, and can be corrected according to the outcome of the oral part, in positive or in negative.

Students with physical or learning disabilities (DSA) should be aware that in order to ask for possible accommodations or other circumstances regarding lectures, coursework and exams it is required to follow the instructions detailed on the Aulaweb webpage "Lauree in Matematica e SMID".
In particular, dispensary or compensatory measures have to be required in advance (at least 10 days before) with respect to the date of the exam by writing to the teacher and to the School's disability liaison (see the instructions).

ASSESSMENT METHODS

The written part will consist in the resolution of exercises on the topics of the teaching programme (see also the Aims and Learning Outcomes section). Through the resolution of the exercises the student will be evaluted in:
- her skills in identifying the theoretical and practical results which are necessary to approach and solve the problems, and general knowledge of the very same results;
- her skills in applying the suitable algorithms and procedures to solve the exercises;
- her skills in providing the right arguments and justifications for the involved steps she follows.

During the oral part the teacher will evaluate the student's argumentation skills. General knowledge which has not positively emerged during the written part will be also assessed.

Exam schedule