On the classification of Inoue surfaces

Abstract

We prove that any Inoue surface admits a unique holomorphic connection. Using this result we show that two Inoue surfaces S=H×C/G, S'=H×C/G' are biholomorphic if and only if G, G' are conjugate in the group of affine transformations of H×C. This result allows us to prove explicit classification theorems for Inoue surfaces: Let M be the set of SL(3,Z)-matrices M with a real eigenvalue α>1 and two non-real eigenvalues, and N the set of GL(2,Z)-matrices N with a real eigenvalue α>1 and (N)= 1. We prove that: For any GL(3,Z)-similarity class M∈ M/, there exists exactly two biholomorphism classes of type I Inoue surfaces. For any GL(2,Z) similarity class N=[N]∈ N+/ and positive integer r∈N*, we have a finite set of deformation classes of type II Inoue surfaces. This set is parameterised by the quotient of Z2/(I2-N)Z2+rZ2 by an action of the "positive centraliser" Z+ GL(2,Z)(N) of N in GL(2,Z). The set of biholomorphism types corresponding to a deformation class, endowed with its natural topology, can be identified with either C* or C. For any GL(2,Z)-similarity class N=[N]∈ N-/ and positive integer r∈N*, we have a finite set of biholomorphism classes of type III Inoue surfaces. This set is parameterised by the quotient of Z2/(I2+N)Z2+rZ2 by an action of Z+ GL(2,Z)(N). In both cases the group Z+ GL(2,Z)(N) is infinite cyclic (see section 5).