Fractional Hardy type inequalities on homogeneous Lie groups in the case Q<sp
Abstract
In this paper, we obtain a fractional Hardy inequality in the case Q<sp on homogeneous Lie groups, and as an application we show the corresponding uncertainty principle. Also, we show a fractional Hardy-Sobolev type inequality on homogeneous Lie groups. In addition, we prove fractional logarithmic Hardy-Sobolev and fractional Nash type inequalities on homogeneous Lie groups. We note that the case Q>sp was extensively studied in the literature, while here we are dealing with the complementary range Q<sp.
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