Abstract:In [P] we characterize the pairs of weights for which the fractional integral operator $I_{\gamma }$ of order $\gamma $ from a weighted Lebesgue space into a suitable weighted $BMO$ and Lipschitz integral space is bounded. \par In this paper we consider other weighted Lipschitz integral spaces that contain those defined in [P], and we obtain results on pairs of weights related to the boundedness of $I_{\gamma }$ acting from weighted Lebesgue spaces into these spaces. Also, we study the properties of those classes of weights and compare them with the classes given in [P]. Then, under additional assumptions on the weights, we obtain necessary and sufficient conditions for the boundedness of $I_{\gamma }$ between $BMO$ and Lipschitz integral spaces. For the boundedness between Lipschitz integral spaces we obtain sufficient conditions.
Keywords: two-weighted inequalities, fractional integral, weighted Lebesgue spaces, \newline weighted Lipschitz spaces, weighted BMO spaces.
AMS Subject Classification: Primary 42B25