Orderings of k-Markov Numbers
Abstract
The k-Markov numbers, introduced by Gyoda and Matsushita, are those which appear in positive integral solutions to x2 + y2 + z2 + k(xy + xz + yz) = (3+3k)xyz. When k =0, this recovers the ordinary Markov numbers. A long-standing question in the theory of Markov numbers is Frobenius's unicity conjecture, concerning whether every Markov number is the maximum in a unique solution triple. Aigner gave a series of weaker, related conjectures which were confirmed to be true by Lee, Li, Rabideau, and Schiffler using techniques from the theory of cluster algebras. We show here that k-Markov numbers also satisfy Aigner's conjectures.
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