Real convergence and periodicity of p-adic continued fractions
Abstract
Continued fractions have been generalized over the field of p-adic numbers, where it is still not known an analogue of the famous Lagrange's Theorem. In general, the periodicity of p-adic continued fractions is well studied and addressed as a hard problem. In this paper, we show a strong connection between periodic p--adic continued fractions and the convergence to real quadratic irrationals. In particular, in the first part we prove that the convergence in R is a necessary condition for the periodicity of the continued fractions of a quadratic irrational in Qp. Moreover, we leave several conjectures on the converse, supported by experimental computations. In the second part of the paper, we exploit these results to develop a probabilistic argument for the non-periodicity of Browkin's p-adic continued fractions. The probabilistic results are conditioned under the assumption of uniform distribution of the p-adic digits of a quadratic irrational, that holds for almost all p-adic numbers.
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