Information updated until 30/06/2026 CODE 84023 ACADEMIC YEAR 2026/2027 CREDITS 6 cfu anno 2 MATEMATICA 11907 (LM-40 R) - GENOVA 6 cfu anno 1 MATEMATICA 11907 (LM-40 R) - GENOVA 6 cfu anno 3 MATEMATICA 8760 (L-35) - GENOVA SCIENTIFIC DISCIPLINARY SECTOR MATH-03/A LANGUAGE Italian TEACHING LOCATION GENOVA SEMESTER 1° Semester OVERVIEW The course will give an introduction to analytic number theroy. The lecture will be in Italian unless requested otherwise by the students. AIMS AND CONTENT LEARNING OUTCOMES The aim of the course is to introduce basic elementary and analytical concepts, and the relative techniques, for the study of arithmetic problems, in particular concerning prime numbers. The course provides analytical prerequisites necessary to address more advanced issues in Number Theory, Arithmetic Geometry and related topics. AIMS AND LEARNING OUTCOMES The aim of the course is to introduce basic elementary and analytical concepts, and the relative techniques, for the study of arithmetic problems, in particular concerning prime numbers. The course provides analytical prerequisites necessary to address more advanced issues in Number Theory, Arithmetic Geometry and related topics. It is expected that by the end of the course the students have mastered the basic techniques of analytic number theory and that they can employ them to solve arithmetic problems. PREREQUISITES No specific prerequiste beside basic notions of algebra and analysis. TEACHING METHODS Traditional SYLLABUS/CONTENT Arithmetical functions: arithmetical and algebraic aspects, asymptotic behavior. Elementary methods for the distribution of primes: Euler, Legendre and Chebyshev. Elements of cryptography. Complements of Analysis: Dirichlet series, Mellin transform and Poisson formula. Riemann zeta function: general properties and distribution of zeros. Prime Number Theorem: explicit formulae and PNT with remainder. Dirichlet L-functions: Dirichlet characters, general properties of L-functions and distribution of zeros. Dirichlet's theorem. RECOMMENDED READING/BIBLIOGRAPHY rse notes. A.E.Ingham - The Distribution of Prime Numbers - Cambridege U.P. 1964. H.Davenport - Multiplicative Number Theory - Springer 1980. G.Tenenbaum, M.Mendes-France - The Prime Numbers and Their Distribution - AMS 2000. G.Tenenbaum - Introduction to Analytic and Probabilistic Number Theory - Cambridge U.P., 1995 TEACHERS AND EXAM BOARD SANDRO BETTIN Ricevimento: By appointment, to be requested via email. ALESSANDRO FAZZARI LESSONS LESSONS START Information can be found at this link. Class schedule The timetable for this course is available here: Portale EasyAcademy EXAMS EXAM DESCRIPTION Written and Oral exam. Students with a grade greater than or equal to 14 are admitted to the oral exam. The final grade is based on the grade of the written exam, but can be increased or decreased depending on the student's performance in the oral exam. ASSESSMENT METHODS Evaluation of written and oral examination. In the written part, some exercises will be proposed, and the quality of the solutions written by the students will be evaluated. The oral part deals mainly with the theory developed during the course, and the understanding of the theorems and the ability of reproducing proofs of the students will be evaluated. FURTHER INFORMATION Compensatory and dispensatory measures Disability/Invalidity/Specific Learning Disorder Dispensatory measures and compensatory tools are intended to enable students to achieve the same learning objectives as their fellow students, not to facilitate the examination. The use of compensatory tools and the application of dispensatory measures must be authorised in advance by the teacher in agreement with the Referee. To take advantage of the adaptations during the examination, fill in the Adaptation request form; the request will be automatically sent by the system to the teacher in charge of the teaching, to the Contact Person of your School/Area/Department and in copy to the Sector; you will also receive a copy of the request sent by e-mail. The adjustments available to students are as follows: Additional time (+30% DSA) Additional time (+50% disability/invalidity) Additional time during oral exams to organise the answer Calculator (programmable and graphing calculators are not allowed) Conceptual Maps Tables and/or Forms Take the exam in written form Take the exam in oral form Tutor reader (for written tests only) Tutor-writer (for written tests only) Your request for adaptations must be submitted at least 7 working days before the scheduled exam date. All information for students with disabilities and DSA is available on the webpage: Services for students with disabilities or DSA | UniGe | University of Genoa Reference for inclusion: Sergio Di Domizio - sergio.didomizio@unige.it
