About Dixmier's conjecture

Abstract

The well-known Dixmier conjecture asks if every algebra endomorphism of the first Weyl algebra over a characteristic zero field is an automorphism. We bring a hopefully easier to solve conjecture, called the γ,δ conjecture, and show that it is equivalent to the Dixmier conjecture. Up to checking that in the group generated by automorphisms and anti-automorphisms of A1 all the involutions belong to one conjugacy class, we show that every involutive endomorphism from (A1,γ) to (A1,δ) is an automorphism (γ and δ are two involutions on A1), and given an endomorphism f of A1 (not necessarily an involutive endomorphism), if one of f(X),f(Y) is symmetric or skew-symmetric (with respect to any involution on A1), then f is an automorphism.