Flag Hardy spaces and Marcinkiewicz multipliers on the Heisenberg group: an expanded version

Abstract

Marcinkiewicz multipliers are Lp bounded for 1<p<∞ on the Heisenberg group Hnn×R (D. Muller, F. Ricci and E. M. Stein) despite the lack of a two parameter group of automorphic dilations on Hn. This lack of dilations underlies the inability of classical one or two parameter Hardy space theory to handle Marcinkiewicz multipliers on Hn when 0<p≤1. We address this deficiency by developing a theory of flag Hardy spaces Hflagp on the Heisenberg group, 0<p≤1, that is in a sense `intermediate' between the classical Hardy spaces Hp and the product Hardy spaces Hproductp on Cn×R. We show that flag singular integral operators, which include the aforementioned Marcinkiewicz multipliers, are bounded on Hflagp, as well as from Hflagp to Lp, for 0<p≤1. We characterize the dual spaces of Hflag1 and Hflagp, and establish a Calder\'on-Zygmund decomposition that yields standard interpolation theorems for the flag Hardy spaces Hflagp. In particular, this recovers the Lp results by interpolating between those for Hflagp and L2 (but regularity sharpness is lost).