A new proof of maximal theorem on Heisenberg groups
Abstract
Given 0≤α<1, we define \[arraylr Mαf(u,v,t) = R (0,0,0) vol \R\α-1 R|f [(u,v,t)(ξ,η,τ)-1]|dξdηdτarray\] where R⊂R2n+1 is a rectangle parallel to the coordinates. Moreover, denotes the multiplication law on a real Heisenberg group. The Lp-boundedness of M0 has been previously proved by M. Christ. We show MαLp(R2n+1) Lq(R2n+1) for α=1 p-1 q,~ 1<p≤ q<∞ by applying a geometric covering lemma due to Córdoba and Fefferman.
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