A new proof of a known special case of the Jacobian Conjecture

Abstract

The famous Jacobian Conjecture asks if a morphism f:K[x,y] K[x,y] with invertible Jacobian, is invertible (K is a characteristic zero field). A known result says that if K[f(x),f(y)] ⊂eq K[x,y] is an integral extension, then f is invertible. We slightly generalize this known result to the following: If for some "good" λ ∈ K (in a sense that will be explained) m K[x,y] ≠ K[x,y] for every maximal ideal m of K[f(x),f(y)][x+ λ y], then f is invertible. We also apply our ideas to the Jacobian Conjecture, without any further assumptions.