Multiparameter singular integrals on the Heisenberg group: uniform estimates

Abstract

We consider a class of multiparameter singular Radon integral operators on the Heisenberg group H1 where the underlying variety is the graph of a polynomial. A remarkable difference with the euclidean case, where Heisenberg convolution is replaced by euclidean convolution, is that the operators on the Heisenberg group are always L2 bounded. This is not the case in the euclidean setting where L2 boundedness depends on the polynomial defining the underlying surface. Here we uncover some new, interesting phenomena. For example, although the Heisenberg group operators are always L2 bounded, the bounds are not uniform in the coefficients of polynomials with fixed degree. When we ask for which polynoimals uniform L2 bounds hold, we arrive at the same class where uniform bounds hold in the euclidean case.