The Jacobian Conjecture fails for pseudo-planes

Abstract

A smooth complex variety satisfies the Generalized Jacobian Conjecture if all its \'etale endomorphisms are proper. We study the conjecture for Q-acyclic surfaces of negative Kodaira dimension. We show that G-equivariant counterexamples for infinite group G exist if and only if G=C* and we classify them relating them to Belyi-Shabat polynomials. Taking universal covers we get rational simply connected C*-surfaces of negative Kodaira dimension which admit non-proper C*-equivariant \'etale endomorphisms. We prove also that for every integers r≥ 1, k≥ 2 the Q-acyclic rational hyperplane u(1+urv)=wk, which has fundamental group Zk and negative Kodaira dimension, admits families of non-proper \'etale endomorphisms of arbitrarily high dimension and degree, whose members remain different after dividing by the action of the automorphism group by left and right composition.