Dynamics of convergent power series on the integral ring of a finite extension of
Abstract
Let K be a finite extension of the field Qp of p-adic numbers and be its integral ring. The convergent power series with coefficients in are studied as dynamical systems on . A minimal decomposition theorem for such a dynamical system is obtained. It is proved that there are uncountably many minimal subsystems, provided that there is a minimal set consisting of infinitely many points. In particular, the complete detailed minimal decompositions of all affine systems are derived.
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