Boundedness for fractional Hardy-type operator on variable exponent Herz-Morrey spaces

Abstract: In this paper, the fractional Hardy-type operator of variable order $\beta(x)$ is shown to be bounded from the variable exponent Herz-Morrey spaces $M\dot{K}{p{{1}},q{{1}}(\cdot)}^{\alpha(\cdot),\lambda}(\R^{n})$ into the weighted space $M\dot{K}{p_{{2}},q{{2}}(\cdot)}^{\alpha(\cdot),\lambda}(\R^{n},\omega)$, where $\alpha(x)\in L^{\infty}(\mathbb{R}^{n})$ be log-H\"older continuous both at the origin and at infinity, $\omega=(1+|x|)^{-\gamma(x)}$ with some $\gamma(x)>0$ and $ 1/q{{1}}(x)-1/q{{2}}(x)=\beta(x)/n$ when $q{_{1}}(x)$ is not necessarily constant at infinity.