Sharp bounds for Hardy-type operators on mixed radial-angular spaces
Abstract
In this paper, by using the rotation method, we calculate that the sharp bound for n-dimensional Hardy operator H on mixed radial-angular spaces. Furthermore, we also obtain the sharp bound for n-dimensional fractional Hardy operator Hβ from Lp|x|Lθp( Rn) to Lq|x|Lθq( Rn), where 0<β<n, 1<p,q,p,q<∞ and 1/p-1/q=β/n. By using duality, the corresponding results for the dual operators H* and H*β are also established. In addition, the sharp weak-type estimate for H is also considered.
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