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In this paper we study inequalities with weights for fractional operators Tα given by convolution with a kernel K_\alpha which is supposed to satisfy some size condition and a fractional H¨ormander type condition. As it is done for singular integrals, the conditions on the kernel have been generalized from the scale of Lebesgue spaces to that of Orlicz spaces. Our fractional operators include as particular cases the classical fractional integral I_\alpha , fractional integrals associated to an homogeneous function and fractional integrals given by a Fourier multiplier.