Mixing actions of the rationals

Abstract

We study mixing properties of algebraic actions of Qd, showing in particular that prime mixing Qd actions on connected groups are mixing of all orders, as is the case for Zd-actions. This is shown using a uniform result on the solution of S-unit equations in characteristic zero fields due to Evertse, Schlickewei and Schmidt. In contrast, algebraic actions of the much larger group Q* are shown to behave quite differently, with finite order of mixing possible on connected groups.

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