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We show that for any 1 < p < ∞, the space Hank p ޒ( + ) ⊆ B(L p ޒ( + )) of all Hankel operators on L p ޒ( + ) is equal to the w * -closure of the linear span of the operators θ u :We deduce that Hank p ޒ( + ) is the dual space of A p ޒ( + ), a half-line analogue of the Figà-Talamanca-Herz algebra A p .)ޒ( Then we show that a function m : ޒ * + → ރ is the symbol of a p-completely bounded multiplier Hank p ޒ( + ) → Hank p ޒ( + ) if and only if there exist α ∈ L ∞ ޒ( + ; L p ( )) and β ∈ L ∞ ޒ( + ; L p ′ ( )) such that m(s + t) = ⟨α(s), β(t)⟩ for a.e.(s, t) ∈ ޒ * 2 + .We also give analogues of these results in the (easier) discrete case.
Arnold et al. (Tue,) studied this question.
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