Let Sn? 1 denote unit sphere in Rn equipped with the normalized Lebesgue measure. Let? ? Lr (Sn? 1) be a homogeneous function of degree zero. The variable Marcinkiewicz fractional integral operator is defined as _ b,? ? ₘ? (f) (z1) = (Z? 0 | Z |z1? z2|? s? (z1? z2) b (z1)? b (z2) m |z1? z2|n? 1? ? (z1) f (z2) dz2 | 2 ds s3) 1/2. The commutators of Marcinkiewicz fractional operator of variable order is shown to be bounded on the grand variable Herz-Morrey spaces M? K? (? ), u),? ? , p (? ) (Rn).
Sultan et al. (Wed,) studied this question.