Let be a connected and simply connected Lie group with Lie algebra . We say that a subset in the set of coadjoint orbits is convex hull separable when the convex hulls differ for any pair of distinct coadjoint orbits in . In this paper, we define a class of solvable Lie groups, and we give an explicit construction of an overgroup and a quadratic map sending each generic orbit in to a -orbit in , in such a manner that the set is convex hull separable. We then call a weak quadratic overgroup for . Thanks to this construction, we prove that any nilpotent Lie group, with dimension at most 7 admits such a weak quadratic overgroup. Finally, we produce different examples of solvable Lie groups, having weak quadratic overgroups, but which are not in our class of Lie groups and for which usual constructions fail to hold.

• 出版日期2013-8