The two-dimensional Centralizer Conjecture

Abstract

A result by C. C.-A. Cheng, J. H. Mckay and S. S.-S. Wang says the following: Suppose the Jacobian of A and B is invertible in C[x,y] and the Jacobian of A and w is zero for A,B,w ∈ C[x,y]. Then w ∈ C[A]. We show that in CMW's result it is possible to replace C by any field of characteristic zero, and we conjecture the following 'two-dimensional Centralizer Conjecture over D': Suppose the Jacobian of A and B is invertible in D[x,y] and the Jacobian of A and w is zero for A,B,w ∈ D[x,y], D is an integral domain of characteristic zero. Then w ∈ D[A]. We show that if the famous two-dimensional Jacobian Conjecture is true, then the two-dimensional Centralizer Conjecture is true.