On the periodicity of continued fractions in elliptic fields

Article [1] raised the question of the finiteness of the number of square-free polynomials f ∈ ℚ[h] of fixed degree for which \(\sqrt f \) has periodic continued fraction expansion in the field ℚ((h)) and the fields ℚ(h)(\(\sqrt f \)) are not isomorphic to one another and to fields of the form ℚ(h)\(\left( {\sqrt {c{h^n} + 1} } \right)\), where c ∈ ℚ* and n ∈ ℕ. In this paper, we give a positive answer to this question for an elliptic field ℚ(h)(\(\sqrt f \)) in the case deg f = 3.