Optimal factorizations of rational numbers using factorization trees (1408.4162v1)

Abstract: Let $m_t(\alpha)$ denote the $t$-metric Mahler measure of the algebraic number $\alpha$. Recent work of the first author established that the infimum in $m_t(\alpha)$ is attained by a single point $\bar\alpha = (\alpha_1,\ldots,\alpha_N)\in \overline{\mathbb Q}^N$ for all sufficiently large $t$. Nevertheless, no efficient method for locating $\bar \alpha$ is known. In this article, we define a new tree data structure, called a factorization tree, which enables us to find $\bar\alpha$ when $\alpha\in \mathbb Q$. We establish several basic properties of factorization trees, and use these properties to locate $\bar\alpha$ in previously unknown cases.