Clusters, twistors and stability conditions I

Abstract

We consider a quiver Q of ADE type and use cluster combinatorics to define two complex manifolds S and L. The space S can be identified with a quotient of the space of stability conditions on the CY3 category associated to Q. The space L has a canonical map to the complex cluster Poisson space X C which we prove to be a local homeomorphism. When Q is of type A, we give a geometric description of the spaces S and L as moduli spaces of meromorphic quadratic differentials and projective structures respectively. In the sequel paper we will introduce a space Z C whose fibre over over a point ε∈ C is isomorphic to S when ε=0 and to L otherwise. The problem of constructing sections of this map gives a geometric approach to the Riemann-Hilbert problems defined by the Donaldson-Thomas invariants.