Mathematical Research Letters
Volume 11, Issue 3, May 2004 pp. 279-283.
Mahler measures generate the largest possible groupsAuthors: Arturas Dubickas
Author institution: Vilnius University
Summary: We prove that free additive and multiplicative groups generated by the set of all Mahler measures consist of all real algebraic integers and of all positive algebraic numbers, respectively. More precisely, we show that every positive algebraic number can be written as a quotient of two Mahler measures. It is also shown that the set of all Mahler measures is not an additive semigroup.
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