Hardy spaces and Campanato spaces associated with Laguerre expansions and higher order Riesz transforms
Abstract
Let \(L\) be the Laguerre differential operator which is the self-adjoint extension of the differential operator \[ L := Σi=1n [-∂2∂ xi2 + xi2 + 1xi2 (i2 - 14 ) ] \] initially defined on \(Cc∞(R+n)\) as its natural domain, where \( ∈ [-1/2,∞)n\), \(n ≥ 1\). In this paper, we first develop the theory of Hardy spaces \(HpL\) associated with \(L\) for the full range \(p ∈ (0,1]\). Then we investigate the corresponding BMO-type spaces and establish that they coincide with the dual spaces of \(HpL\). Finally, we show boundedness of higher-order Riesz transforms on Lebesgue spaces, as well as on our new Hardy and BMO-type spaces.
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