Contractive Hardy--Littlewood inequalities in the Dirichlet range
Abstract
The class Aαp consists of those analytic functions f in the unit disc such that \[\|f\|α,pp := |f(0)|p+∫01 (ddr Mpp(r,f)) (1-r2)α-1 \,dr < ∞,\] where Mpp(r,f) is the radial integral mean of |f|p and 0<α, p <∞. For α>1, Aαp is the standard weighted Bergman space, and A1p=Hp. We consider Aαp for 0<α<1 and show that (weighted) isometric conformal invariance extends to this range, and we also clarify the relation between Aαp and the classical Besov spaces. Our main result is the contractive inequality \|f\|β,q ≤ \|f\|α,p, valid when 0<α<β<∞ and α/p=β/q. We also identify the functions for which equality is attained. We thus extend recent results of the second-named author (1≤ α<β) and Llinares (β=1 and p=2). The extension of results from the classical range 1≤ α < ∞ to the Dirichlet range 0<α <1 uses arguments relying on analytic continuation.
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