The conference schedule is available below
All lectures will be held in room 101 at the Faculty of Mathematics and Information Science, Warsaw University of Technology.
The chairman list:
Mini courses:
- Łukasz Błaszczyk, Faces of Mathematical Modeling
- Yosef Yomdin, Singularity Theory in Super-resolution and Whitney extensions
- Michał Zwierzyński, Why do We Need Modern Geometry?
Lectures:
- Lev Birbrair, Lipschitz Geometry of Surface germs
- Wojciech Domitrz, On Tabachnikov Problem on Lagrangian Webs
- Lucia Ivonne Hernandez Martinez, Asymptotic lines defined by the Gauss map components of a surface in $\mathbb R^4$. Part II
- Zbigniew Jelonek, Bi-Lipschitz equivalent cones with different degrees
- Piotr Mormul, Moduli of 1-[Goursat-] flags and of special 2-flags
- Naomichi Nakajima, Extrinsic dually flat geometry and singularity theory
- Nozomi Nakatsuyama, Bertrand framed surfaces in the Euclidean 3-space and its applications
- Takashi Nishimura, A simple question arising from creative line families in the plane
- Tomasz Pełka, Lagrangian tori at radius zero
- Gabriel Pietrzkowski, Explicit solutions of the a1-type Lie-Scheffers system and a general Riccati equation
- Osamu Saeki, Special generic maps and Gromoll filtration
- Kentaro Saji, Inner angles and Gauss-Bonnet formulas for central singularities of D4 bifurcations of fronts
- Federico Sanchez Bringas, Asymptotic lines defined by the Gauss map components of a surface in $\mathbb R^4$. Part I
- Runa Shimada, Normal forms of deformations of cuspidal S1 singularities and their self-intersections
- Ewa Stróżyna, TBA
- Masatomo Takahashi, On geodesics of framed surfaces in the Euclidean 3-space
- Masato Tanabe, Complex surface singularity links and their immersions
- Hiroshi Teramoto, Algebraic Local Cohomology for Mixed-Modules and Its Application to Singularity Theory
- Asahi Tsuchida
- Takahiro Yamamoto, Envelopes created by families of parabolas in the plane
- Anna Zamojska-Dzienio, The algebraic approach to barycentric coordinates
Topics:
- Differential geometry and singularities
- Singularities of Lagrangian and Legendrian varietes
- Classification of fronts and frontals
- Singularities in affine and symplectic geometry
- Hamiltonian systems and generalizations
- Topology of real and complex singularities
Photo of the conference participants:
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