Lie–Palais theorem

Template:Short description In differential geometry, a field of mathematics, the Lie–Palais theorem is a partial converse to the fact that any smooth action of a Lie group induces an infinitesimal action of its Lie algebra. Template:Harvs proved it as a global form of an earlier local theorem due to Sophus Lie.

Let ${\displaystyle 𝔤}$ be a finite-dimensional Lie algebra and ${\displaystyle M}$ a closed manifold, i.e. a compact smooth manifold without boundary. Then any infinitesimal action ${\displaystyle a:𝔤\to 𝔛(M)}$ of ${\displaystyle 𝔤}$ on ${\displaystyle M}$ can be integrated to a smooth action of a finite-dimensional Lie group ${\displaystyle G}$, i.e. there is a smooth action ${\displaystyle \mathrm{\Phi }:G\times M\to M}$ such that ${\displaystyle a(\alpha )=d_e\mathrm{\Phi }(\cdot ,x)(\alpha )}$ for every ${\displaystyle \alpha \in 𝔤}$.

If ${\displaystyle M}$ is a manifold with boundary, the statement holds true if the action ${\displaystyle a}$ preserves the boundary; in other words, the vector fields on the boundary must be tangent to the boundary.

The example of the vector field ${\displaystyle d/dx}$ on the open unit interval shows that the result is false for non-compact manifolds.

Similarly, without the assumption that the Lie algebra is finite-dimensional, the result can be false. Template:Harvtxt gives the following example due to Omori: consider the Lie algebra ${\displaystyle 𝔤}$ of vector fields of the form ${\displaystyle f(x,y)\partial /\partial x+g(x,y)\partial /\partial y}$ acting on the torus ${\displaystyle M={ℝ}^2/{\mathbb{Z}}^2}$ such that ${\displaystyle g(x,y)=0}$ for ${\displaystyle 0\le x\le 1/2}$. This Lie algebra is not the Lie algebra of any group.

Template:Harvtxt gives an infinite-dimensional generalization of the Lie–Palais theorem for Banach–Lie algebras with finite-dimensional center.

• Template:Citation Reprinted in collected works volume 5.
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