Deformations and Inversion Formulas For Formal Automorphisms in Noncommutative Variables
Abstract
Let z=(z1, z2, ..., zn) be noncommutative free variables and t a formal parameter which commutes with z. Let k be any unital integral domain of any characteristic and Ft(z)=z-Ht(z) with Ht(z)∈ k[[t]]< < z >>× n and the order o(Ht(z))≥ 2. Note that Ft(z) can be viewed as a deformation of the formal map F(z):=z-Ht=1(z) when it makes sense (for example, when Ht(z)∈ k[t]< < z >>× n). The inverse map Gt(z) of Ft(z) can always be written as Gt(z)=z+Mt(z) with Mt(z)∈ k[[t]]< < z >>× n and o(Mt(z))≥ 2. In this paper, we first derive the PDE's satisfied by Mt(z) and u(Ft), u(Gt)∈ k[[t]]< < z >> with u(z)∈ k< < z >> in the general case as well as in the special case when Ht(z)=tH(z) for some H(z)∈ k< < z >>× n. We also show that the formal power series above are actually characterized by certain Cauchy problems of these PDE's. Secondly, we apply the derived PDE's to prove a recurrent inversion formula for formal maps in noncommutative variables. Finally, for the case char. k=0, we derive an expansion inversion formula by the planar binary rooted trees.
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