Caffarelli-Kohn-Nirenberg inequalities on Lie groups of polynomial growth
classification
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math.APmath.FA
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inequalitiesspacescaffarelli-kohn-nirenberggrowthpolynomialassociatedbanachcarnot-caratheodory
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In the setting of a Lie group of polynomial volume growth, we derive inequalities of Caffarelli-Kohn-Nirenberg type, where the weights involved are powers of the Carnot-Caratheodory distance associated with a fixed system of vector fields which satisfy the H\"ormander condition. The use of weak $L^p$ spaces is crucial in our proofs and we formulate these inequalities within the framework of $L^{p,q}$ Lorentz spaces (a scale of (quasi)-Banach spaces which extend the more classical $L^p$ Lebesgue spaces) thereby obtaining a refinement of, for instance, Sobolev and Hardy-Sobolev inequalities.
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