MATHEMATICS
Year: 1
- FURTHER EDUCATIONAL ACTIVITIES - LANGUAGE SKILLS
- ADVANCED ALGEBRA A
- ADVANCED ANALYSIS A
- ADVANCED GEOMETRY A
- ANALYTIC AND PROBABILISTIC METHODS IN MATHEMATICAL PHYSICS A
- ANALYTIC AND PROBABILISTIC METHODS IN MATHEMATICAL PHYSICS B
- APPRENTICESHIP
- APPROXIMATION METHODS A
- DYNAMICAL SYSTEMS A
- FURTHER EDUCATIONAL ACTIVITIES - COMPUTER SCIENCE AND TELEMATIC SKILLS
- INTELLIGENT SYSTEMS
- MATHEMATICAL LOGIC
- MODELS FOR BIOLOGICAL SYSTEMS
- NUMERICAL METHODS AND APPLICATIONS A
- NUMERICAL SOLUTIONS OF PDE'S A
- STATISTICS A
- THEORETICAL PHYSICS
- TOPICS IN ADVANCED ALGEBRA
- TOPICS IN ADVANCED ANALYSIS A
- TOPICS IN ADVANCED GEOMETRY A
- TOPICS IN CATEGORY THEORY
Year: 2
- FURTHER EDUCATIONAL ACTIVITIES - LANGUAGE SKILLS
- ADVANCED ALGEBRA B
- ADVANCED ANALYSIS B
- ADVANCED GEOMETRY B
- ANALYTIC AND PROBABILISTIC METHODS IN MATHEMATICAL PHYSICS B
- APPRENTICESHIP
- APPROXIMATION METHODS B
- CHOICE ACTIVITIES
- DYNAMICAL SYSTEMS B
- FINAL DEFENSE
- FURTHER EDUCATIONAL ACTIVITIES - COMPUTER SCIENCE AND TELEMATIC SKILLS
- FURTHER SKILLS VALUABLE FOR THE JOB MARKET
- GEOMETRICAL METHODS IN PHYSICS
- INTELLIGENT SYSTEMS
- MATHEMATICAL LOGIC
- NUMERICAL METHODS AND APPLICATIONS B
- NUMERICAL SOLUTIONS OF PDE'S B
- PROCESS ALGEBRAS
- STATISTICS B
- TOPICS IN ADVANCED ALGEBRA
- TOPICS IN ADVANCED ANALYSIS B
- TOPICS IN ADVANCED GEOMETRY B
- TOPOS THEORY
funzione in un contesto di lavoro:
competenze associate alla funzione:
sbocchi professionali:
- Matematici - 2.1.1.3.1
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The students with a master’s degree in Mathematics:
a) have a thorough ability in identifying the meaningful elements needed for analyzing problems, even in non-mathematical contexts;
b) can assess the exactness of a proof as well as the coherence of an argument, identifying in a clear way hypotheses and consequences.
Such skills are provided and checked via all activities foreseen by the formation process, especially by the mean of seminars and the preparation of the master’s thesis.
The students with a master’s degree in Mathematics:
- can communicate in a clear way problems, ideas and solutions revolving about Mathematics, their own and from other authors, to a general and a specific audience, in their own language and in English, both in written and oral form;
- can talk in a clear and fruitful way with experts from other sectors, recognizing the possibility of formalizing situations of applied, industrial or financial interest in a mathematical
The skills listed above are acquired and checked via all activities foreseen by the educational process, in particular by the mean of seminars and the preparation for the final examination.
The students with a master’s degree in Mathematics:
- have developed a learning method that allows them to further continue their studies, particularly with a Doctorate in Mathematics or in related areas;
- have a flexible attitude, and are able to quickly integrate in working environments, adapting easily to new problems.
These learning abilities are developed along the whole educational period, thanks to different teaching methodologies, such as seminars, team works, reports, as well as further tasks related to the elaboration of the master’s thesis, during which the candidates must show autonomy in processing new information, not given by the instructor, understand them, analyze them, and explain them, and also providing original contributions.
La prova finale consiste nella presentazione e discussione di una tesi di fronte ad una commissione, la tesi deve essere elaborata in modo originale dallo studente sotto la guida di un relatore e redatta in lingua inglese. La tesi può essere una profonda rielaborazione critica di risultati presenti nella letteratura matematica, ovvero essere un'indagine originale su argomenti di ricerca. Può essere svolta sia presso l'università, sia presso gruppi di ricerca, Enti o imprese.