The starred Dixmier conjecture for A1
Abstract
Let A1(K)=K x,y | yx-xy= 1 be the first Weyl algebra over a characteristic zero field K and let α be the exchange involution on A1(K) given by α(x)= y and α(y)= x. The Dixmier conjecture of Dixmier (1968) asks: Is every algebra endomorphism of the Weyl algebra A1(K) an automorphism? The aim of this paper is to prove that each α-endomorphism of A1(K) is an automorphism. Here an α-endomorphism of A1(K) is an endomorphism which preserves the involution α. We also prove an analogue result for the Jacobian conjecture in dimension 2, called α-JC2.
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