Fractional type operators on the Heisenberg group

Abstract

Let (·) be the Koranyi norm on the Heisenberg group Hn (R2n × R, \, · \, ) defined by \[ (x,t) = ( |x|4 + 16 t2 )1/4, \,\,\,\, (x,t) ∈ Hn. \] For 0 ≤ α < Q:=2n+2, m ∈ N (1 - αQ, ∞ ), and m positive constants α1, ..., αm such that α1 + · · · + αm = Q - α, we consider the following generalization of the Riesz potential on Hn \[ Tα, \, mf(x,t) = ∫Hn f(y,s) Πj=1m ((Aj y, rj-2 s)-1 · ( x, t))-αj \, dy \, ds, \] where, in the case 0 < α < Q, the Aj's are matrices belonging to Sp (2n, R) SO(2n) and rj = 1 for every j=1, ..., m; for α = 0, we consider Aj = rj-1 \, I2n × 2n for every j=1, ..., m, where the rj's are positive constants such that ri2 - rj2 ≠ 0 if i ≠ j. In this note we study the behavior of these operators on variable Hardy spaces in Hn.

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