Program

Time/Day Monday 7th Tuesday 8th Wednesday 9th Thursday 10th
09:00 – 10:00 Opening ceremony Plenary talk Plenary talk Plenary talk
10:00 – 11:00 Plenary talk Plenary talk Plenary talk Plenary talk
11:00 – 11:30 Plenary talk Coffee break Coffee break Coffee break
11:30 – 12:20 Invited talks (two simultaneously) Invited talks (three simultaneously) Invited talks (three simultaneously)
12:20 – 14:30 Lunch time Lunch time Lunch time Lunch time
14:30 – 15:10 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2
15:10 – 15:50 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2
15:50 – 16:20 Coffee break & Posters Coffee break & Posters Coffee break & Posters Coffee break & Posters
16:20 – 17:00 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2
17:00 – 17:40 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2
17:40 – 18:00 Coffee break & Posters Coffee break & Posters Coffee break & Posters Coffee break & Posters
18:00 – 19:20 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2
18:40 – 19:20 Special sessions Group 1 Special sessions Group 1 Special sessions Group 2 Special sessions Group 2

Group 1 of Special Sessions:

Geometric Variational Problems; Geometric Analysis; Topological Methods in Algebra, Geometry and Nonlinear Analysis; Poisson and Generalized Geometries; Geometry and Mechanics; Topology and Dynamics; Piecewise Smooth Differential Systems; Singularity Theory and its Applications; Real and Complex Analytic Singular Foliations; Geometric Structures on Manifolds; Lorentzian Geometry and its Applications.

Group 2 of Special Sessions:

Elliptic Partial Differential Equations; Control and Stabilization for Partial Differential Equations; Special Functions and Approximation Theory; Banach Spaces and Set Theory in Interaction; Infinite Dimensional Analysis; Non-associative Algebras; Group Theory; Associative Rings and Algebras; Operator Algebras; Differential Methods in Algebra and Algebraic Geometry; Mathematical Logic and Set Theory.

The program can be downloaded here