Suppose that $G$ is a semi-simple Lie group that acts smoothly (i.e., $C^\infty$) on a smooth, finite dimensional manifold $M$. Does it follow that the action of $G$ is linearizable near any stationary point of the action? This was conjectured by Steve Smale and myself in 1965, and was proved for the case that $M$ and the action were analytic by Bob Herman and Guillemin and Sternberg in two papers from long ago:
Hermann, R.: The formal linearization of a semi-simple Lie algebra of vector fields about a singular pointThe formal linearization of a semi-simple Lie algebra of vector fields about a singular point. Trans. Am. Math. Soc. 130, 105-109 (1968)
Guillemin, V., Sternberg, S.: Remarks on a paper of HermannRemarks on a paper of Hermann. Trans. Am. Math. Soc. 130,110-116 (1968)
I have not heard whether any progress has been made since then and I would be interested to hear from anyone who has heard of a proof or a counter-example. The reason is not just idle curiousity; this is the missing step in a proof that what I call The Principle of Symmetric Criticality is valid for smooth finite dimensional actions of a semi-simple group: see (particularly page 29 of) the paper downloadable here:
http://www.springerlink.com/content/wur75t1t65371812/
for more details on this principle and why it is important, particularly in mathematical physics.
