Entropy Minimality and Four-Cycle Free Graphs
Nishant Chandgotia (Tel Aviv)
Tuesday, October 27, 2015, 10:50 – 12:00, Math -101
Abstract:
A topological dynamical system (X,T) is said to be entropy minimal if all closed T-invariant subsets of X have entropy strictly less than (X,T). In this talk we will discuss the entropy minimality of a class of topological dynamical systems which appear as the space of graph homomorphisms from Z^d to graphs without four cycles; for instance, we will see why the space of 3-colourings of Z^d is entropy minimal even though it does not have any of the nice topological mixing properties.