Let R be a Noetherian integral domain with fraction field K.
Prove that an R-submodule J of K is finitely generated if and
only if there is a nonzero element a in R such that aJ contained in R.
Thanks
Let R be a Noetherian integral domain with fraction field K.
Prove that an R-submodule J of K is finitely generated if and
only if there is a nonzero element a in R such that aJ contained in R.
Thanks