On the tame authomorphism approximation, augmentation Topology of Automorphism Groups and Ind-schemes, and authomorphisms of tame automorphism groups

Abstract

We study authomorphisms of Ind-groups of polynomial automorphisms (wich are singular) via tame approximations. Such objects were pioneeered in research by B.I.Plotkin We obtain a number of properties of Aut(Aut(A)), where A is the polynomial or free associative algebra over the base field K. We prove that all Ind-scheme automorphisms of Aut(K[x1,…,xn]) are inner for n 3, and all Ind-scheme automorphisms of Aut(K x1,…, xn) are semi-inner. As an application, we prove that Aut(K[x1,…,xn]) cannot be embedded into Aut(K x1,…,xn) by the natural abelianization. In other words, the Automorphism Group Lifting Problem has a negative solution. We explore close connection between the above results and the Jacobian conjecture type questions, formulate the Jacobian conjecture for fields of any characteristic.