Optimal structures in convex geometry and combinatorics
Seminar in Mathematics
Abstract:
It is classical that the ball is the unique shape which minimizes surface area for a given fixed volume. But what if we want to minimize surface area where in addition to fixing the volume we also fix the average width of the shape? This question turns out to be a very special case of long-standing conjectures at the heart of convex geometry. In the first part of the talk I will explain these conjectures and the significant progress that we made towards their resolutions. In the second part of the talk I will explain how these geometric problems can provide information on problems in combinatorics, which led us to the discovery of some surprising results in the theory of partially ordered sets.
Abstract:
It is classical that the ball is the unique shape which minimizes surface area for a given fixed volume. But what if we want to minimize surface area where in addition to fixing the volume we also fix the average width of the shape? This question turns out to be a very special case of long-standing conjectures at the heart of convex geometry. In the first part of the talk I will explain these conjectures and the significant progress that we made towards their resolutions. In the second part of the talk I will explain how these geometric problems can provide information on problems in combinatorics, which led us to the discovery of some surprising results in the theory of partially ordered sets.
Practical information
- Informed public
- Free
- This event is internal
Organizer
- Institute of Mathematics
Contact
- Prof. Maryna Viazovska, Director