Information updated until 30/06/2026 CODE 109054 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 SCIENTIFIC DISCIPLINARY SECTOR MATH-01/A LANGUAGE Italian (English on demand) TEACHING LOCATION GENOVA SEMESTER 2° Semester OVERVIEW Category theory is a young branch of mathematics. Born officially in 1945 from a seminal paper by Samuel Eilenberg and Saunders Mac Lane, it soon found important applications in algebra, geometry and logic thanks to ideas of Alexander Grothendieck and William Lawvere. Category theory is currently expanding its areas of application, including physics and computer science, and it is imposing itself as a language to allow these disciplines, and the people working in them, to efficiently communicate with each other. This is achieved by isolating the common aspects of definitions and proofs and allowing, for example, to give a precise meaning to notions like 'natural' or 'canonical'. AIMS AND CONTENT LEARNING OUTCOMES The course introduces the basic notions in category theory: categories, functors, natural transformations, adjunctions, limits, colimits. It also presents some fundamental results, such as Yoneda Lemma and the Special Adjoint Functor Theorem. AIMS AND LEARNING OUTCOMES The aim of the course is to provide a solid knowledge of basic concepts in category theory, and their main applications in mathematical practice. After attending the course, the student will be able to: - rephrase concepts and results, already known or learned afterwards, using the language of category theory; - define mathematical objects by means of their universal property, and use it to derive specific properties of such objects; - exploit the Yoneda lemma and representability of functors to derive results on categories from results on sets; - prove closure properties for classes of objects by means of adjoint functor theorems and monadicity theorems. PREREQUISITES Basic algebra and basic topology TEACHING METHODS Lectures and exercise classes. SYLLABUS/CONTENT 1. Fundamental concepts: categories, functors, natural transformations. 2. Classes of morphisms: epic, monic, iso; full and faithful functors. 3. Limits and colimits, universal objects: initial and terminal objects, (co)products, (co)equalisers, pullback and pushout squares. 4. Yoneda lemma, properties of representable functors. 5. Adjunctions and their properties, adjoint functor theorems, cartesian closed categories. 6. Possible additional topics: - Monads, Eilenberg--Moore and Kleisli constructions, algebras and monadicity theorem. - Monoidal categories and closed monoidal categories: definitions, examples, applications. RECOMMENDED READING/BIBLIOGRAPHY E. Riehl. Category theory in context. Dover, 2015 S. Awodey. Category theory, 2nd edition. Oxford Logic Guides 52, 2010 S. Mac Lane. Categories for the working matematician, 2nd edition. Springer, 1998 TEACHERS AND EXAM BOARD ARVID PEREGO Ricevimento: The teacher will be available for explanations by appointment, that will be agreed by email (at the email address arvid.perego@unige.it) LESSONS LESSONS START The lessons will start following the academic calendar that can be found here: https://corsi.unige.it/corsi/11907/studenti-orario Class schedule The timetable for this course is available here: Portale EasyAcademy EXAMS EXAM DESCRIPTION The final exam consists of an oral examination. In order to apply for adjustments to the rules, DSA students should folow the instructions available on AulaWeb at <https://2023.aulaweb.unige.it/course/view.php?id=12490#section-3>. ASSESSMENT METHODS The oral examination will verify that the student has learned the basic notions from category theory, the results treated during the course, and their proofs and applications. The final evaluation will take into account the correcteness of the exposition, its clarity, and the appropriateness of reasoning. 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) Requests 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 Agenda 2030 - Sustainable Development Goals Quality education Gender equality
