Geometric structures of G-fans associated with rank 3 cluster-cyclic exchange matrices

Abstract

In this paper, we investigate the geometric structures of G-fans associated with rank 3 real cluster-cyclic exchange matrices. In this class, a simple recursion for tropical signs was found, which enables us to study the detailed properties of c-, g-vectors. We introduce two kinds of upper bounds of the G-fans. The first one is the global upper bound, which comes from a hyperbolic surface containing all g-vectors after an initial mutation. The second one is the local upper bound, which reflects the internal separateness structure. As applications, we prove that there is no periodicity among g-vectors, and we completely determine the sign of g-vectors. We also prove the monotonicity of g-vectors under the minimum assumption. Moreover, we show that the three global upper bounds can be simplified to a single uniform upper bound.