Periodicity of Multidimensional Continued Fractions

Abstract

It is known that the continued fraction expansion of a real number is periodic if and only if the number is a quadratic irrational. In an attempt to generalize this phenomenon to other settings, Jun-Ichi Tamura and Shin-Ichi Yasutomi have developed a new algorithm for multidimensional continued fractions (Algebraic Jacobi-Perron algorithm) that involves cubic irrationals, and proved periodicity in some cubic number fields, such as Q([3]m3+1) where m∈Z, and Q(δm) where δm is a root of x3-mx+1=0,\,\,m∈Z,\,\, m≥3 with the algorithm. In this paper, we study some other types of number fields that give rise to periodic continued fractions using the Algebraic Jacobi-Perron algorithm obtaining results for Q([l]ml+1) for any positive integer l. Furthermore, we find that some families of cubic equations, such as x3+3ax2+bx+ab-2a3+1=0,\,b≤3a2-3,\,a,b∈Z, have roots that have periodic multidimensional continued fractions.