Cluster Algebras of Type D4, Tropical Planes, and the Positive Tropical Grassmannian

Abstract

We show that the number of combinatorial types of clusters of type D4 modulo reflection-rotation is exactly equal to the number of combinatorial types of tropical planes in TP5. This follows from a result of Sturmfels and Speyer which classifies these tropical planes into seven combinatorial classes using a detailed study of the tropical Grassmannian Gr(3,6). Speyer and Williams show that the positive part Gr+(3,6) of this tropical Grassmannian is combinatorially equivalent to a small coarsening of the cluster fan of type D4. We provide a structural bijection between the rays of Gr+(3,6) and the almost positive roots of type D4 which makes this connection more precise. This bijection allows us to use the pseudotriangulations model of the cluster algebra of type D4 to describe the equivalence of "positive" tropical planes in TP5, giving a combinatorial model which characterizes the combinatorial types of tropical planes using automorphisms of pseudotriangulations of the octogon.