Ideas about the Jacobian Conjecture

Abstract

Let F:C[x1,…,xn] C[x1,…,xn] be a C-algebra endomorphism that has an invertible Jacobian. We bring two ideas concerning the Jacobian Conjecture: First, we conjecture that for all n, the degree of the field extension C(F(x1),…,F(xn)) ⊂eq C(x1,…,xn) is less than or equal to dn-1, where d is the minimum of the degrees of the F(xi)'s. If this conjecture is true, then the generalized Jacobian Conjecture is true. Second, we suggest to replace in some known theorems the assumption on the degrees of the F(xi)'s by a similar assumption on the degrees of the minimal polynomials of the xi's over C(F(x1)…,f(xn)); this way we obtain some analogous results to the known ones.