Finite Point Configurations and Discrete Integrable Systems
Location
Tsaghkadzor, Armenia
Dates
13/07/2020 to 24/07/2020
Presentation
The summer school will be dedicated to finite point configurations and rigidity, Erdos problems in discrete geometry and frame theory, the Falconer distance conjecture in geometric measure theory, discrete integrable systems and connections between these topics. Participants will be introduced to various open problems and possible research projects in these very active research areas.
Official language of the school: English
Administrative and scientific coordinators
Michael POGHOSYAN (Yerevan State University, Armenia, michael@ysu.am)
Yurii LYUBARSKII (NTNU, Norway, yurii.lyubarskii@ntnu.no)
Scientific committee
Michael LACEY (Georgia Institute of Technology, USA)
Alexander BUFETOV (Aix Marseille, France)
Akos MAGYAR (University of Georgia, USA)
Izabella LABA (University of British Columbia, Canada)
Mahya GHANDEHARI (University of Delaware, USA)
Svitlana MAYBORODA (University of Minnessota, USA)
Scientific program
Course 1: "The Geometry of Fractal Sets from the Perspective of Fourier Analysis and Projection Theory", Krystal TAYLOR (Ohio State University, USA)
Course 2: "Applications of Spectral Graph Theory to problems in Combinatorics and Number Theory", Jonathan PAKIANATHAN (University of Rochester, USA)
Course 3: "Lozenge tilings via algebraic combinatorics", Greta PANOVA (University of Pennsylvania, USA)
Course 4: "Determinantal point processes", Alexander BUFETOV (Aix Marseille, France)
Course 5: "Geometric Configurations and Sets of Positive Upper Density", Neil LYALL (University of Georgia, USA)
Course 6: "An interplay between Fuglede Conjecture, tiling and Gabor analysis", Azita MAYELI (City University of New York, USA)
How to participate:
For registration and application to a CIMPA financial support, follow the instructions given here.
Deadline for registration and application: March 22, 2020.