401-4037-69L  O-Minimality and Diophantine Applications

SemesterAutumn Semester 2019
LecturersA. Forey
Periodicitynon-recurring course
Language of instructionEnglish



Courses

NumberTitleHoursLecturers
401-4037-69 VO-Minimality and Diophantine Applications
No class on 5 December 2019. In replacement, there will be a class on Monday, 9 December 2019 (15-17 in HG F 26.1).
2 hrs
Thu15:15-17:00HG G 26.1 »
09.12.15:15-17:00HG F 26.1 »
A. Forey

Catalogue data

AbstractO-minimal structures provide a framework for tame topology as envisioned by Grothendieck. Originally it was mainly a topic of interest for real algebraic geometers. However, since Pila and Wilkie proved their counting theorem for rational points of bounded height, many applications to diophantine and algebraic geometry have been found.
Learning objectiveThe overall goal of this course is to provide an introduction to o-minimality and to prove results needed for diophantine applications.
ContentThe first part of the course will be devoted to the definition of o-minimal structures and to prove the cell decomposition theorem, which is crucial for describing the shape of subsets of an o-minimal structure. In the second part of the course, we will prove the Pila-Wilkie counting theorem. The last part will be devoted to diophantine applications, with the proof by Pila and Zanier of the Manin-Mumford conjecture and, if time permit, a sketch of the proof by Pila of the André-Oort conjecture for product of modular curves.
LiteratureG. Jones and A. Wilkie: O-minimality and diophantine geometry, Cambridge University Press
L. van den Dries: Tame topology and o-minimal structures, Cambridge University Press
Prerequisites / NoticeThis course is appropriate for people with basic knowledge of commutative algebra and algebraic geometry. Knowledge of mathematical logic is welcomed but not required.

Performance assessment

Performance assessment information (valid until the course unit is held again)
Performance assessment as a semester course
ECTS credits4 credits
ExaminersA. Forey
Typesession examination
Language of examinationEnglish
RepetitionThe performance assessment is offered every session. Repetition possible without re-enrolling for the course unit.
Mode of examinationoral 20 minutes
This information can be updated until the beginning of the semester; information on the examination timetable is binding.

Learning materials

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Offered in

ProgrammeSectionType
Mathematics MasterSelection: Algebra, Number Thy, Topology, Discrete Mathematics, LogicWInformation