Some remarks on the group of formal diffeomorphisms of the line

Abstract

Consider a strictly positively graded finitely generated infinite-dimensional real Lie algebra g. It has a well-defined Lie group G, which is an inverse limit of finite-dimensional nilpotent Lie groups (a pro-unipotent group). Generally, representations (even finite-dimensional representations) of g and actions of g on manifolds do not admit liftings to G. There is a canonically defined dense subgroup G⊂ G with a stronger (Polish) topology, which admits lifting of representations of g in finite-dimensional spaces (and, more generally, of representations of g by bounded operators in Banach spaces). We describe this completion for the group Diff of formal diffeomorphisms of the line, i.e., substitutions of the form x x+ p(x), where p(x)=a2 x2+… are formal series, and show that the group Diff consists of series with subfactorial growth of coefficients.

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