Dimension free boundedness of Riesz transforms for the Grushin operator
Dimension free boundedness of Riesz transforms for the Grushin operator
Let $G = - \Delta_{\xi} - |\xi|^2 \frac{\partial^2}{\partial \eta^2}$ be the Grushin operator on $\R^n \times \R.$ We prove that the Riesz transforms associated to this operator are bounded on $L^p (\R^{n+1}), 1 < p < \infty$ and their norms are independent of the dimension $n$.