Topological conjugacy between Schneider's continued fraction map and a shift map on Qp
Abstract
We prove that Schneider's continued fraction map is topologically conjugate to a shift map defined on Qp, and the topological conjugation fp → Qp is an isometry such that f(Q)=Z[1p]. Furthermore, for x ∈ Qp we proved that x ∈ Q if and only if f(x) ∈ Z[1p].
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