Fractional series operators on discrete Hardy spaces
Abstract
We estudy the Hp(Z) - q(Z) boundedness of the fractional series operator Tγ given by \[ (Tγb)(j) = Σi ≠ j b(i)|i-j|α|i+j|β, \] where 0 ≤ γ < 1, α, β > 0 and α + β = 1 -γ. By means of a counter-example, we also show that the operator Tγ is not bounded from Hp(Z) into Hq(Z).
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