On the multiplier problem for the ball on graded Lie groups

Abstract

In this note, we consider a non-commutative analogy of the classical Fefferman multiplier problem for the ball. More precisely, if is the characteristic function of the unit interval I=[0,1], we investigate a family of differential operators R on a graded Lie group G, for which the multipliers (R) are bounded on Lp(G), if and only if p=2.