A twisted rational map over an algebraically closed and complete non-archimedean field K of characteristic 0 is a composition of a rational map over K and certain continuous automorphism of K. We explore the dynamical properties of tame twisted rational maps. It turns out twisted rational maps share many features with rational maps, such as classification of Fatou components, equidistribution, etc. This is joint work with Hongming Nie.

https://videoconf-colibri.zoom.us/j/91816627844?pwd=UEZtYmdaNkdibXlRdHAvU252cnBUZz09

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