JOURNAL OF MATHEMATICAL EXTENSION

‎Let $G$ be a locally compact group and $H$ be a closed subgroup of $G$‎. ‎It is well-known that $G/H$ as a homogeneous space admits a strongly quasi invariant measure and the linear mapping $T_H$ of $L^1(G)$ into $L^1(G/H)$ is bounded and surjective‎. ‎In this note it is shown that by means of complex interpolation theorem‎, ‎that under restrictions on weight function $\omega$‎, ‎the mapping $T_H$ of weighted spaces $L^p(G,\omega)$ into $L^p(G/H,\varpi)$ is well-defined‎, ‎bounded linear and surjective‎ , ‎for $1\leq p \leq \infty$‎.

homogeneous space‎, ‎weighted space‎, rho-function, ‎quasi invariant measure, relatively invariant measure