Fractal phenomenon in c- and g-vectors of the Markov quiver

Abstract

We study the C- and G-patterns associated with rank 3 skew-symmetrizable matrices of B-invariant type, including the Markov quiver. Motivated by the self-contained simple mutations in Markov-type cluster algebras, we prove that large classes of subpatterns of modified c- and g-vectors are linearly isomorphic, yielding a fractal structure of the corresponding G-fan. We further derive explicit recursive formulas for all modified c- and g-vectors in terms of integer pairs satisfying a recursion analogous to the Calkin-Wilf tree, which leads to a parameterization by coprime integers. As an application, we describe all connected components of the complement of the support of the G-fan, and show that they are generated recursively by three kinds of linear maps.