Stability theorems for H-type Carnot groups

Abstract

We introduce the H-type deviation δ( G) of a step two Carnot group G, which measures the deviation of the group from the class of Heisenberg-type groups. We show that δ( G)=0 if and only if G carries a vertical metric which endows it with the structure of an H-type group. We compute the H-type deviation for several naturally occurring families of step two groups. In addition, we provide analytic expressions which are comparable to the H-type deviation. As a consequence, we establish new analytic characterizations for the class of H-type groups. For instance, denoting by N(g)=(||x||h4+16||t||v2)1/4, g=(x+t), the canonical Kaplan-type quasi-norm in a step two group G with taming Riemannian metric gh gv, we show that G is H-type if and only if ||∇0 N(g)||h2=||x||h2/N(g)2 for all g 0. Similarly, we show that G is H-type if and only if N2-Q is L-harmonic in G \0\. Here ∇0 denotes the horizontal differential operator, L the canonical sub-Laplacian, and Q = v1+2 v2 the homogeneous dimension of G, where v1 v2 is the stratification of the Lie algebra. It is well-known that H-type groups satisfy both of these analytic conclusions. The new content of these results lies in the converse directions. Motivation for this work comes from a longstanding conjecture regarding polarizable Carnot groups. We formulate a quantitative stability conjecture regarding the fundamental solution for the sub-Laplacian on step two Carnot groups. Its validity would imply that all step two polarizable groups admit an H-type group structure. We confirm this conjecture for a sequence of anisotropic Heisenberg groups.