The standard logistic map $x_{n+1} = rx_{n}(1-x_{n})$ is known to be chaotic for $r\geq4$. In this talk, I will look at a similar but 2-dimensional version of this map and study its fixed point structures, bifurcations, and basins of attraction.
Friday, January 31, 2020 - 13:00
427 Thackeray Hall