Sur le d\'eveloppement en fraction continue d'une g\'en\'eralisation de la cubique de Baum et Sweet

Abstract

In 1976, Baum and Sweet gave the first example of a power series that is algebraic over the field F2(T) and whose continued fraction expansion has partial quotients with bounded degree. This power series is the unique solution of the equation TX3+X-T=0. In 1986, Mills and Robbins described an algorithm that allows to compute the continued fraction expansion of the Baum--Sweet power series. In this paper, we consider the more general equations TXr+1+X-T=0, where r is a power of a prime number p. Such an equation has a unique solution in the field Fp((T-1)). Applying an approach already used by Lasjaunias, we give a description of the continued fraction expansion of these algebraic power series.