Topological Lie bialgebra structures and their classification over g[\![x]\!]

Abstract

This paper is devoted to a classification of topological Lie bialgebra structures on the Lie algebra g[\![x]\!], where g is a finite-dimensional simple Lie algebra over an algebraically closed field F of characteristic 0 . We introduce the notion of a topological Manin pair (L, g[\![x]\!]) and present their classification by relating them to trace extensions of \( F[\![x]\!] \). Then we recall the classification of topological doubles of Lie bialgebra structures on g[\![x]\!] and view the latter as a special case of the classification of Manin pairs. The classification of topological doubles states that up to some notion of equivalence there are only three non-trivial doubles. It is proven that topological Lie bialgebra structures on g[\![x]\!] are in bijection with certain Lagrangian Lie subalgebras of the corresponding doubles. We then attach algebro-geometric data to such Lagrangian subalgebras and, in this way, obtain a classification of all topological Lie bialgebra structures with non-trivial doubles. When F = C the classification becomes explicit. Furthermore, this result enables us to classify formal solutions of the classical Yang-Baxter equation.