The dimension of automorphism groups of algebraic varieties with pseudo-effective log canonical divisors

Abstract

Let (X,D) be a log smooth pair of dimension n, where D is a reduced effective divisor such that the log canonical divisor KX + D is pseudo-effective. Let G be a connected algebraic subgroup of Aut(X,D). We show that G is a semi-abelian variety of dimension \n-(V), n\ with V := X D. In the dimension two, Shigeru Iitaka claimed in his 1979 Osaka J. Math. paper that G q(V) for a log smooth surface pair with (V) = 0 and pg(V) = 1. We (re)prove and generalize this classical result for all surfaces with =0 without assuming Iitaka's classification of logarithmic Iitaka surfaces or logarithmic K3 surfaces.