Levin-Cochran-Lee inequalities and best constants on homogeneous groups
Abstract
In this paper, we apply a direct method instead of a limit approach, for proving the Levin-Cochran-Lee inequalities. First, we state and prove Levin-Cochran-Lee type inequalities on a homogeneous group G with parameters 0<p≤ q<∞. Furthermore, for the case p=q, we prove the sharp inequalities with power weights and derive some other new inequalities.
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