Georgia Institute of Technology College of Sciences

Dynamical systems exhibiting some degree of hyperbolicity often admit “fractal" invariant objects.  However, extra symmetries or “randomness” in the system often preclude the existence of such fractal objects.

I will give some concrete examples of the above and then discuss problems and results related to random dynamics and group actions on surfaces.  I will especially focus on questions related to absolute continuity of stationary measures.

The totally non-negative Grassmannian is the set of points in a real Grassmannian such that all Plucker coordinates have the same sign (some can be zero). I will show how points in totally non-negative Grassmannians arise from the spaces of polynomials in one variable whose Wronskian has only real roots. Then I will discuss a similar result for the spaces of quasi-exponentials.

The main statements of this talk should be understandable to an undergraduate student. Somewhat surprisingly, the proofs use the theory of quantum integrable systems related to $GL(n)$. I will try to explain the logic of such proofs in a gentle way.

This talk is based on a joint work with S. Karp and V. Tarasov.