Centralisers of formal maps

Abstract

We consider formal maps in any finite dimension d with coefficients in an integral domain K with identity. Those invertible under formal composition form a group G. We consider the centraliser Cg of an element g∈G which is tangent to the identity of G. Elements of finite order always have an uncountable centraliser. If g has infinite order and K is a field of characteristic zero we show that Cg contains an isomorphic copy of the additive group (K,+). If g has infinite order and K has finite characteristic we show that Cg contains an uncountable abelian subgroup. The proofs are quite different in finite characteristic and in characteristic zero, but are connected by so-called sum functions.