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THEMATIC PROGRAMS |
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| November 4, 2025 |
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Thematic Program on O-minimal Structures
and Real Analytic Geometry
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| Organizing Committee: | Scientific Committee: | |
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David Marker (UIChicago) |
Edward Bierstone (Toronto) Lou van den Dries (UIUC) Robert Moussu (Bourgogne) Alex Wilkie (Oxford) |
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Supported by |
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Mailing List : To receive updates on the program please subscribe to our mailing list at www.fields.utoronto.ca/maillist
OVERVIEW
The main focus of the program is to extend local resolution of singularities techniques in order to establish the o-minimality of certain expansions of the real field, such as those generated by the functions studied by Ilyashenko and Ecalle in his proof of Dulac’s problem. Over the last twenty years, the notion of o-minimal structure has become increasingly useful in the fields of real algebraic and real analytic geometry. Discovered by Van den Dries in the early 1980s and developed in its present model-theoretic generality soon after by Knight, Pillay and Steinhorn this notion provides a unifying framework for what is sometimes loosely referred to as tame real geometry. Since then, the development of o-minimality has been strongly influenced by real analytic geometry; this is apparent in the adaptation of methods of real analytic geometry to the o-minimal setting and in the motivation to find new and mathematically interesting examples of o-minimal structures. Conversely, model-theoretic methods available through the o-minimal point of view have led to new insights into real analytic geometry. Many recent developments in the intersection of o-minimality and
real analytic geometry use resolution of singularities in crucial
ways, and they can in turn be viewed as extending the notion of
resolution of singularities in the sense of the preparation theorems
mentioned above. There is good reason to believe that extending
resolution algorithms to certain classes of functions involving
exponential scales may help shed new light on various interesting
problems in real analytic geometry, coming from Pfaffian geometry
and dynamical systems. Examples of particular interest to us are
the classes of multisummable and of resurgent functions. The program's
focus and main activities, two week-long workshops and three graduate
courses, will be centered around the topics described above. There
are of course many other developments both in o-minimality and in
real anaytic geometry, and only the future will tell which of them
may be relevant in addressing the questions discussed here. We intend
to explore such developments in some of the mini-workshops.
Scientific Activities
Distinguished Lecture Series
May 25- 27, 2009
Jean-Christophe Yoccoz, Collège de France
Geometry and Model Theory Seminar
Week-long workshops
January 12 - 16, 2009
Winter School in o-minimal Geometry
Organizer: Matthias AschenbrennerJune 22 - 26, 2009
Workshop on Finiteness Problems in Dynamical SystemsOrganized by Fernando Sanz and Patrick Speissegger
This workshop will consist of regular invited one-hour lectures and will be held at the conclusion of the proposed program.
Mini-workshops
A key activity will be the mini-workshops, intended to bring people together for two to three days to work on one particular project, while allowing other visitors to the program to participate. Each mini-workshop involves between five and ten core participants and typically focuses on the understanding of a specific problem or solution thereof.
January 30-31, 2009
Expansions of the real field by multiplicative groups
Organizers: Ayhan Gunaydin, Chris Miller
March 5-6, 2009
O-minimality for certain Dulac transition maps
Organizers: Tobias Kaiser, Patrick SpeisseggerMarch 16-20, 2009
The Infinitesimal Hilbert's 16th Problem
Organizers: Dmitry Novikov, Sergei YakovenkoMarch 23-25, 2009
Workshop on new perspectives in Valuation theory
Organizers: Franz-Viktor Kuhlmann , Bernard Teissier
April 3-4, 2009
Differential Kaplansky Theory
Organizers: Salma Kuhlmann, Mickael MatusinskiMay 6-8, 2009
Mini-Workshop on (Co)Homology and sheaves in O-minimal and Related Settings
Organizers: M. Edmundo, A. Piekosz and L. PrelliJune 5-6, 2009
Decidability in analytic situations
Organizer: Gareth O. JonesJune 8-10, 2009
Finiteness theorems for certain quasi-regular algebras and Hilbert's 16th problem
Organizer: Abderaouf Mourtada
Graduate courses Jan 19 - April 17, 2009
Three semester-long graduate courses will take a more detailed look at the topics of the programme and will serve both students looking for a research problem and established researchers hoping to learn more about a particular subject. We plan to teach the three courses in parallel; each course in turn will be split into three modules. Each of these modules is four weeks long, with three hours of lectures per week. The courses are:
Course on Topics in o-minimalityModule 1: o-minimality and Hardy fields (C. Miller)Course on Multisummability and Quasianalyticity
Module 2: Construction of o-minimal structures from quasianalytic classes (J.-P. Rolin)
Module 3: Pfaffian closure (P. Speissegger)
Module 1: Basic multisummability (R. Schäfke)Course on Resolution of Singularities
Module 2: Resurgent functions (D. Sauzin)
Module 3: Non-oscillatory trajectories (F. Sanz)
Module 1: Resolution of singularities for functions (E. Bierstone)
Module 2: Resolution of singularities for foliations (Felipe Cano)
Module 3: Resolution of singularities of real analytic vector fields (D. Panazzolo)
Apply to the Program:
All scientific events are open to the mathematical sciences community.
Visitors who are interested in office space or funding are
requested to apply by filling out the application
form Additional support is available (pending NSF funding)
to support junior US visitors to this program. Fields scientific
programs are devoted to research in the mathematical sciences, and
enhanced graduate and post-doctoral training opportunities. Part
of the mandate of the Institute is to broaden and enlarge the community,
and to encourage the participation of women and members of visible
minority groups in our scientific programs.
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