Uniform finite generation of lie groups locally-isomorphic to $SL(2,R)$
Uniform finite generation of lie groups locally-isomorphic to $SL(2,R)$
Let G be a connected Lie group with Lie algebra g, (Xi, •••, X^} a minimal generating set for g.The order of generation of G with respect to {Xi, •••, X Ä } is the smallest integer n such that every element of G can be written as a product …