From green mutation to X-evolution: flows and foliations on cluster complexes

Abstract

For any point X in the cluster complex Cpx(C) of a 2-Calabi-Yau category C, we introduce X-evolution flow on Cpx(C). We show that such a flow induces a piecewise linear one-dimensional X-foliation with two singularities, the unique sink X and the unique source X[1]. Moreover, we show that evolution flows on cluster complexes are continuous refinement/generalization of green mutations on cluster exchange graphs. For the cluster category of a Dynkin or Euclidean quiver Q, we prove that the X-foliation is compact or semi-compact, for various choices of X. As an application, we show that Cpx(C) is spherical (Dynkin case) or contractible (Euclidean case). As a byproduct, we show that the fundamental group of the cluster exchange graph of Q is generated by squares and pentagons.