Algebraic integers with continued fraction expansions containing palindromes and square roots with prescribed periods
Abstract
We present a characterization of the algebraic integers with continued fraction expansions of the form [a0, a1, …, an, s], where (a1, …, an) is a palindrome and s ∈ N≥ 1. In particular, we focus on the special case where (a1, …, an) = (m, …, m), providing a detailed characterizations of the corresponding algebraic integers and s in terms of Fibonacci polynomials. Then, we derive new expansions of square roots of integers with these periods, given m and n. Moreover, we explicitly determine the fundamental solutions of both positive and negative Pell's equations corresponding to this family of integers.
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