Topological model for q-deformed rational number and categorification

Abstract

Let D3 be a bigraded 3-decorated disk with an arc system A. We associate a bigraded simple closed arc ηrs on D3 to any rational number rs∈Q=Q\∞\. We show that the right (resp. left) q-deformed rational numbers associated to rs, in the sense of Morier-Genoud-Ovsienko (resp. Bapat-Becker-Licata) can be naturally calculated by the q-intersection between ηrs and A (resp. dual arc system A*). The Jones polynomials of rational knots can be also given by such intersections. Moreover, the categorification of ηrs is given by the spherical object Xrs in the Calabi-Yau-X category of Ginzburg dga of type A2. Reduce to CY-2 case, we recover result of Bapat-Becker-Licata with a slight improvement.