Abstract
We derive a Chebotarev Theorem for finite homogeneous extensions of shifts of finite type. These extensions are of the form\(\tilde \sigma \):X×G/H→X×G/H where\(\tilde \sigma \)(x,gH)=(σx, α(x)gH), for some finite groupG and subgroupH. Given a σ-closed orbit τ, the periods of the\(\tilde \sigma \)-closed orbits covering τ define a partition of the integer |G/H|. The theorem then gives us an asymptotic formula for the number of closed orbits with respect to the various partitions of the integer |G/H|. We apply our theorem to the case of a finite extension and of an automorphism extension of shifts of finite type. We also give a further application to ‘automorphism extensions’ of hyperbolic toral automorphisms.
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