A Lie group corresponding to the free Lie algebra and its universality

Abstract

Consider the real free Lie algebra frn with generators ω1, …, ωn. Since it is positively graded, it has a completion frn consisting of formal series. By the Campbell--Hausdorff formula, we have a corresponding Lie group Frn. It is the set (frn) in the completed universal enveloping algebra of frn. Also, the group Frn is a 'submanifold' in the algebra of formal associative noncommutative series in ω1, …, ωn, the 'submanifold' is determined by a certain system of quadratic equations. We consider a certain dense subgroup Frn∞⊂ Frn with a stronger (Polish) topology and show that any homomorphism π from frn to a real finite-dimensional Lie algebra g can be integrated in a unique way to a homomorphism from Frn∞ to the corresponding simply connected Lie group G. If π is surjective, then also is surjective. Note that Pestov (1993) constructed a separable Banach--Lie group such that any separable Banach--Lie group is its quotient.

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