Variable Calder\'on-Hardy spaces on the Heisenberg group
Abstract
Let Hn be the Heisenberg group and Q = 2n+2. For 1 < q < ∞, γ > 0 and an exponent function p(·) on Hn, which satisfy log-H\"older conditions, with 0 < p- ≤ p+ < ∞, we introduce the variable Calder\'on-Hardy spaces Hp(·)q, γ(Hn), and show for every f ∈ Hp(·)(Hn) that the equation \[ L F = f \] has a unique solution F in Hp(·)q, 2(Hn), where L is the sublaplacian on Hn, 1 < q < n+1n and Q (2 + Qq)-1 < p.
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