Contractible flow of stability conditions via global dimension function

Abstract

We introduce an analytic method that uses the global dimension function gldim to produce contractible flows on the space StabD of stability conditions on a triangulated category D. In the case when D=D(Sλ) is the topological Fukaya category of a graded surface Sλ, we show that gldim-1(0,y) contracts to gldim-1(0,x) for any 1 x y, provided (x,y) does not contain `critical' values \1+w∂/m∂ w∂0, ∂∈∂Sλ\, where the pair (m∂,w∂) consists of the number m∂ of marked points and the winding number w∂ associated to a boundary component ∂ of Sλ. One consequence is that the global dimension of D(Sλ) must be one of these critical values. Besides, we remove the assumptions in Kikuta-Ouchi-Takahashi's classification result on triangulated categories with global dimension less than 1.