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| Date: | Tue, December 15, 2015 |
| Time: | 14:15 |
| Place: | Research I Seminar Room |
Abstract: The theory of iterated monodromy groups represents a computationally efficient way to store the combinatorial information about any dynamical system induced by a post-critically finite branched covering. Nice examples of usage of the group theory in holomorphic dynamics are the solution of Hubbard Twisted Rabbit Problem (given by Bartholdi and Nekrashevych) and the theory of IMG of quadratic polynomials.