Upcoming talks:
6 XII | Nicanor Carrasco-Vargas (UJ) Medvedev degrees of subshifts Show abstract
The Medvedev degree of a subshift is an invariant of topological conjugacy that measures how hard it is to find configurations in the subshift from the viewpoint of recursion theory. These degrees share some properties with topological entropy for amenable groups, such as being non-increasing by factor maps, and having a simple behavior for direct products and disjoint unions.
In this talk I will present the basic theory of Medvedev degrees of subshifts, and some results about the classification problem of these degrees for subshifts of finite type on different finitely generated groups.
As a motivation I will present some applications of the existence of SFTs with nontrivial Medvedev degree. For instance, this is a key ingredient in Hochman's proof that in the space of ℤ2-actions on the Cantor space, there is no action with residual topological conjugacy class (i.e. that the theorem of Kechris and Rosendal for ℤ-actions is not true for ℤ2-actions). |
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The seminar takes place on Fridays
at 10.15-11.45 AM (Kraków time) - currently CET (UTC+1) in the room 1016
of the Jagiellonian University
Department of Mathematics
and Computer Science
(ul. Łojasiewicza 6, Cracow).