- Docente: Giovanni Paolini
- Credits: 13
- SSD: MAT/03
- Language: Italian
- Moduli: Giovanni Paolini (Modulo 1) Stefano Francaviglia (Modulo 2) Luca Migliorini (Modulo 3)
- Teaching Mode: Traditional lectures (Modulo 1) Traditional lectures (Modulo 2) Traditional lectures (Modulo 3)
- Campus: Bologna
- Corso: First cycle degree programme (L) in Mathematics (cod. 8010)
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from Sep 20, 2023 to Dec 22, 2023
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from Feb 19, 2024 to May 27, 2024
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from Mar 14, 2024 to Mar 14, 2024
Learning outcomes
At the end of the course, the student has the correct mathematical interpretation of curves and surfaces in space and the foundations of the theory of functions of a complex variable, with particular emphasis on the geometric viewpoint. They know how to use the acquired knowledge to analyze fundamental concepts and classic examples. They are capable of applying such knowledge to other mathematical disciplines and to solving simple problems posed by applied sciences. They possess learning skills and a high standard of knowledge and competence, such that it allows them to access lectures and programs of second-level degree courses, particularly in the study of more advanced topics in differential and complex geometry.
Course contents
First semester (module 1)
Covering spaces: lifting properties, universal cover, classification of covering spaces, deck transformations. Cell complexes.
Curves in R^3. Surfaces in R^3: first and second fundamental form, curvature, Theorema Egregium, Gauss-Bonnet theorem. Notes on abstract differential manifolds.
Second semester - First part (module 3)
Power series and analytic functions. Holomorphic functions and Cauchy-Riemann equations. Differential forms and integrations. Cauchy's integral formula and fundamental theorems of the theory of holomorphic functions of one complex variable.
Second semester - Second part (module 3)
Abstract surfaces, Riemann surfaces, holomorphic forms and fields on surfaces. Riemann-Hurwitz formula. Genus-degree formula. Elliptic curves. Hyperbolic surfaces.
Readings/Bibliography
Hatcher, Algebraic Topology
Manetti, Topologia
Do Carmo, Differential Geometry of Curves & Surfaces
Pressley, Elementary Differential Geometry
J. Milnor, Topology from the Differential Viewpoint
S. Donaldson, Riemann Surfaces
Benetetti & Petronio, Lectures on Hyperbolic Geometry
Freitag Busam, Complex Analysis
Stein, Complex Analysis
Teaching methods
Lectures in the classroom with blackboard.
Assessment methods
The assessment is conducted independently for the two semesters of the course. Once both semesters have been passed with grades of at least 18/30, the exam can be recorded (with the grade being the average of the grades obtained in the two semesters).
The grade for a single semester is valid for 12 months. In other words, the two semesters must be passed within 12 months of each other.
For students who attended the Geometry 3 course before the academic year 2023/24, the grades obtained in the individual semesters with Professors Manaresi or Idà remain valid. In this case, the validity is exceptionally extended to 24 months but does not go beyond the January/February 2025 session.
Examination methods for each of the two semesters
There is a written exam followed by an oral exam. Both exams must be taken in the same exam session. Access to the oral exam is granted by scoring at least 16/30 in the written exam. The final grade is determined by the oral exam.
Handing in your work at the end of a written exam invalidates any previously obtained grade in a written or oral exam. The oral exam cannot be repeated without first passing the written exam again.
The written exam lasts 2 hours. During the written exam, you are allowed to have with you two A4 sheets, handwritten in a reasonable size (no more than one line of text per 1/2 cm), containing any result deemed useful for the exam. No other reference materials, such as books or notes, are allowed.
Office hours
See the website of Giovanni Paolini
See the website of Stefano Francaviglia
See the website of Luca Migliorini