Abstract: Some elementary properties of relative torsionless modules with respect to a faithful and balanced bimodule are studied. Some equivalent conditions for a left or right Noether ring is a QF-ring is gotten. It is proved that a finitely generated module is an ω-torsionless module if and only if it is an ω-1-syzygy module if and only if it is an ω-1-torsionfree module when ω is a generalized tilting bimodule. Moreover, the extension closure of the class of ω-torsionless modules is investigated, and some classical results are generalized to the relative case.

Key words: extension closure, ω-torsionless modules, ω-reexive modules, (strong)grade of modules related to ω