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On a theorem of Serret on continued fractions

Published 2013-01-25, updated 2015-07-08Version 2

A classical theorem in continued fractions due to Serret shows that for any two irrational numbers x and y related by a transformation $\gamma$ in PGL(2,Z) there exist s and t for which the complete quotients x_s and y_t coincide. In this paper we give an upper bound in terms of $\gamma$ for the smallest indices s and t.

Categories: math.NT

Keywords: refinement, hurwitzs classic theorem, simple linear inequalities, continued fraction algorithms, irrational numbers

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arXiv:1301.5944 [math.NT]Abstract References Reviews Resources

On a theorem of Serret on continued fractions

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On a theorem of Serret on continued fractions

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arXiv:1301.5944 [math.NT]Abstract References Reviews Resources