摘要
In this article, we solve some word equations originated from discrete dynamical systems related to antisymmetric cubic map. These equations emerge when we work with primitive and greatest words. In particular, we characterize all the cases for which (β1β1) = (β2β) where β1 and β2 are the greatest words in 〈〈β31〉〉 and 〈〈β32〉〉 of M(n).
In this article, we solve some word equations originated from discrete dynamical systems related to antisymmetric cubic map. These equations emerge when we work with primitive and greatest words. In particular, we characterize all the cases for which (β1β1) = (β2β) where β1 and β2 are the greatest words in 〈〈β31〉〉 and 〈〈β32〉〉 of M(n).
基金
supported by Beit Berl College
