39 research outputs found
Spectral multipliers for Laplacians with drift on Damek-Ricci spaces
We prove a multiplier theorem for certain Laplacians with drift on
Damek-Ricci spaces, which are a class of Lie groups of exponential growth. Our
theorem generalizes previous results obtained by W. Hebisch, G. Mauceri and S.
Meda on Lie groups of polynomial growth.Comment: 13 page
On the codimension of the abnormal set in step two Carnot groups
In this article we prove that the codimension of the abnormal set of the
endpoint map for certain classes of Carnot groups of step 2 is at least three.
Our result applies to all step 2 Carnot groups of dimension up to 7 and is a
generalisation of a previous analogous result for step 2 free nilpotent groups
A sufficient condition for nonrigidity of Carnot groups
In this article we consider contact mappings on Carnot groups. Namely, we are interested in those mappings whose differential preserves the horizontal space, defined by the first stratum of the natural stratification of the Lie algebra of a Carnot group. We give a sufficient condition for a Carnot group G to admit an infinite dimensional space of contact mappings, that is, for G to be nonrigid. A generalization of Kirillov's Lemma is also given. Moreover, we construct a new example of nonrigid Carnot grou