On optimal simultaneous rational approximation to \((\omega ,\omega ^{2})^{\tau}\) with \(\omega \) being some kind of cubic algebraic function (Q2465759)

The Jacobi-Perron algorithm (JPA) and modified Jacobi-Perron algorithm (MJPA) are multidimensional generalizations of the simple continued fractions over the real number field. In the present paper it is shown that each rational approximant to \((\omega,\omega^2)^\tau\) given by the JPA or MJPA is optimal, where \(\omega\) is an algebraic function satisfying \(\omega^3+k\omega-1=0\) or \(\omega^3+kd\omega-d=0.\) Analogous result similar to \textit{S. Ito} et al. [J. Number Theory 99, 255--283 (2003; Zbl 1135.11326)] is also obtained.