Let (a"broken vertical bar, A mu) be a shift of finite type with a Markov probability, and (Y, nu) a non-atomic standard measure space. For each symbol i of the symbolic space, let I broken vertical bar (i) be a non-singular automorphism of (Y, nu). We study skew products of the form (omega, y) a dagger broken vertical bar (sigma omega, I broken vertical bar(omega 0) (y)), where sigma is the shift map on (a"broken vertical bar, A mu). We prove that, when the skew product is recurrent, it is ergodic if and only if the I broken vertical bar (i) 's have no common non-trivial invariant set.
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