Functional identities of one variable

Abstract

Let A be a centrally closed prime algebra over a characteristic 0 field k, and let q:A A be the trace of a d-linear map (i.e., q(x)=M(x,...,x) where M:Ad A is a d-linear map). If [q(x),x]=0 for every x∈ A, then q is of the form q(x) =Σi=0d μi(x)xi where each μi is the trace of a (d-i)-linear map from A into k. For infinite dimensional algebras and algebras of dimension >d2 this was proved by Lee, Lin, Wang, and Wong in 1997. In this paper we cover the remaining case where the dimension is d2. Using this result we are able to handle general functional identities of one variable on A; more specifically, we describe the traces of d-linear maps qi:A A that satisfy Σi=0m xi qi(x)xm-i∈ k for every x∈ A.