q-Stability conditions via q-quadratic differentials for Calabi-Yau-X categories

Abstract

Categorically, we introduce the Calabi-Yau-X categories DX of a graded marked surface Sλ, as a q-deformation of the topological Fukaya category D∞ of Sλ. We show that D∞ can be identified with the cluster-X category associated to DX. Geometrically, we construct and identify the space of q-quadratic differentials on the logarithm surface logc Sλ with the space of induced q-stability conditions on DX, for a complex parameter s satisfying Re(s)1. When s=N is an integer, the result gives an N-analogue of Bridgeland-Smith's result for realizing stability conditions on the orbit Calabi-Yau-N category DX/-6mu/[X-N] via CY-N type quadratic differentials. When the genus of S is zero, the space of q-quadratic differentials can be also identified with framed Hurwitz spaces. As a byproduct, the result confirms the conjectural almost Frobenius structure on spaces of q-stability conditions for type A.