Entropy of the Serre functor for partially wrapped Fukaya categories of surfaces with stops

Abstract

We prove that the entropy of the Serre functor S in the partially wrapped Fukaya category of a graded surface with stops is given by the function sending t ∈ R to ht(S) = (1- )t, for t≥ 0, and to ht(S)=(1- )t, for t≤ 0, where = \ω1m1 …, ωbmb,0\, and ωi is the winding number of the ith boundary component ∂i of the surface with b boundary components and mi stops on ∂i . It then follows that the upper and lower Serre dimensions are given by 1- and 1- , respectively. Furthermore, in the case of a finite dimensional gentle algebra A, we show that a Gromov-Yomdin-like equality holds by relating the categorical entropy of the Serre functor of the perfect derived category of A to the logarithm of the spectral radius of the Coxeter transformation.