Lp-improving bounds for spherical maximal operators over restricted dilation sets: radial improvement
Abstract
In this paper, we study the spherical maximal operator ME over E⊂ [1,2], restricted to radial functions. In higher dimensions d≥ 3, we establish a complete range of Lp-improving estimates for ME . In two dimensions, sharp results are also obtained for quasi-Assouad regular sets E. A notable feature is that the high-dimensional results depend solely on the upper Minkowski dimension, while the two-dimensional results also involve other concepts in fractal geometry such as the Assouad spectrum. Additionally, the geometric shapes of the regions corresponding to the sharp Lp-improving bounds differ significantly between the two cases.
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