Aproximaci\'on Din\'amica al Problema de Hermite

In \cite{GCF} it is proved that any quadratic irrational number has a representation as a continuous, infinite and periodic fraction. In 1848, Charles Hermite through a letter Jacobi \cite{Per} wondered if this fact could be generalized to cubic irrational numbers. In This research addresses the Hermite problem, through the study of continuous functions by pieces associated to Fuchsian Groups, particularly a function $f_\Gamma$ associated to the Group Modular $\Gamma$, which was raised in 1978 by Robert Edward and Caroline Series, with this function it is find a representation as infinite periodic continued fraction for irrational numbers quadratics and non-periodic infinite for non-quadratic irrationals. Keywords: Dynamic Approximation, Fuchsian Groups, Hermite Problem.
Comment: in Spanish language