Abstract
ABSTRACT A complete characterization of a measure μ governing the boundedness of fractional integral operators defined on a quasi-metric measure space (non-homogeneous space) from one grand Lebesgue spaces into another one is established. As a corollary, we have a generalization of the Sobolev inequality for potentials with measure. An appropriate problem for grand Morrey spaces is studied. D. Adams trace inequality (i.e. boundedness) is also derived for these operators in grand Lebesgue spaces. In the case of Morrey spaces, we assume that the underlying sets of spaces might be of infinite measure. Under some additional conditions on a measure, we investigate the sharpness of the second parameter in the target space.
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