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Sharp estimates for the identity minus Hardy operator on the cone of decreasing functions
Authors:Natan Kruglyak   Eric Setterqvist
Affiliation:Department of Mathematics, Luleå University of Technology, SE-971 87, Luleå, Sweden ; Global Sun Engineering AB, Aurorum Science Park 2, SE-97775 Luleå, Sweden
Abstract:It is shown that if we restrict the identity minus Hardy operator on the cone of nonnegative decreasing functions $ f$ in $ L^{p}$, then we have the sharp estimate

$displaystyle leftVert (I-H)frightVert _{L^p}leq frac{1}{(p-1)^{frac{1}{p}}}leftVert frightVert _{L^p} $

for $ p=2,3,4,....$ In other words,

$displaystyle leftVert f^{**}-f^* rightVert _{L^p}leq frac{1}{(p-1)^{frac{1}{p}}} leftVert frightVert _{L^p} $

for each $ f in L^p$ and each integer $ pge2$.

It is also shown, via a connection between the operator $ I-H$ and Laguerre functions, that

$displaystyle Vert(1-alpha) I+alpha (I-H)Vert _{L^2to L^2}=Vert I-alpha HVert _{L^2to L^2}=1 $

for all $ alpha in [0,1]$.

Keywords:The Hardy operator   cone of decreasing functions   sharp estimates
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