The Ramanujan Journal | 2021
Simultaneous approximations to p-adic numbers and algebraic dependence via multidimensional continued fractions
Abstract
Unlike the real case, there are not many studies and general techniques for providing simultaneous approximations in the field of p-adic numbers $$\\mathbb Q_p$$\n \n Q\n p\n \n . Here, we study the use of multidimensional continued fractions (MCFs) in this context. MCFs were introduced in $$\\mathbb R$$\n R\n by Jacobi and Perron as a generalization of continued fractions and they have been recently defined also in $$\\mathbb Q_p$$\n \n Q\n p\n \n . We focus on the dimension two and study the quality of the simultaneous approximation to two p-adic numbers provided by p-adic MCFs, where p is an odd prime. Moreover, given algebraically dependent p-adic numbers, we see when infinitely many simultaneous approximations satisfy the same algebraic relation. This also allows to give a condition that ensures the finiteness of the p-adic Jacobi–Perron algorithm when it processes some kinds of $$\\mathbb Q$$\n Q\n -linearly dependent inputs.