Defines Calderón-Hardy spaces H^p_{q,γ}(H^n) and proves unique solvability of L F = f in H^p_{q,2}(H^n) for f in H^p(H^n) when 1 < q < (n+1)/n and a lower bound on p holds.
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Introduces Orlicz-Hardy spaces on the Heisenberg group and establishes a representation theorem for distributions as sub-Laplacians of functions in related Orlicz-Calderón Hardy spaces.
citing papers explorer
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Calder\'on-Hardy type spaces and the Heisenberg sub-Laplacian
Defines Calderón-Hardy spaces H^p_{q,γ}(H^n) and proves unique solvability of L F = f in H^p_{q,2}(H^n) for f in H^p(H^n) when 1 < q < (n+1)/n and a lower bound on p holds.
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On potentials of distributions in Orlicz-Hardy type spaces on the Heisenberg group
Introduces Orlicz-Hardy spaces on the Heisenberg group and establishes a representation theorem for distributions as sub-Laplacians of functions in related Orlicz-Calderón Hardy spaces.