Weakly Exponential Lie Groups

For any connected Lie group G, we introduce the notion of exponential radical Exp G that is the set of all strictly exponentially distorted elements of G. In case G is a connected simply-connected solvable Lie group, we prove that Exp G is a connected normal Lie subgroup in G and the exponential rad

In 1892, F. Engel and E. Study investigated the exponential map of classical Lie groups for the first time. They showed that the special projective Lie groups over C possess surjective exponential functions. Engel also gave a "proof" for the corresponding claims for the other projective classical gr

We show that each Mal'cev splittable -Lie algebra (i.e., each -Lie algebra where ad is splittable) with char = 0 may be realized as a splittable subalgebra of a gl V , where V is a finite-dimensional vector space over , and that each Mal'cev splittable analytic subgroup of a GL n , i.e., each subgro

He thanks both the CNR for its generous support and Roma II for its hospitality. The author also thanks Richard Mosak for reading an earlier version of the paper as well as the referee for a number of remarks which have smoothed out the exposition. 20

This paper is motivated by the behavior of the heat diffusion kernel p t (x) on a general unimodular Lie group. Indeed, contrary to what happens in R n , the P t (x) on a general Lie group is behaving like t &$(t)Â2 for two possibly distinct integers $(t), one for t tending to 0 and another for t te