Leibniz's rule on two-step nilpotent Lie groups

Abstract

Let g be a nilpotent Lie algebra which is also regarded as a homogeneous Lie group with the Campbell-Hausdorff multiplication. This allows to define a generalized multiplication f \# g = (f * g) of two functions in the Schwartz class S(g*), where and are the Abelian Fourier transforms on the Lie algebra g and on the dual g*. In the operator analysis on nilpotent Lie groups an important notion is the one of symbolic calculus which can be viewed as a higher order generalization of the Weyl calculus for pseudodifferential operators of H\"ormander. The idea of such a calculus consists in describing the product f \# g for some classes of symbols. We find a formula for Dα(f \# g) for Schwartz functions f,g in the case of two-step nilpotent Lie groups, that includes the Heisenberg group. We extend this formula to the class of functions f,g such that f, g are certain distributions acting by convolution on the Lie group, that includes usual classes of symbols. In the case of the Abelian group Rd we have f \# g = fg, so Dα(f \# g) is given by the Leibniz rule.