Given a cotorsion pair (, ) in an abelian category , we define cotorsion pairs (, dg) and ( dg, ) in the category N() of N-complexes on . We prove that if the cotorsion pair (, ) is complete and hereditary in a bicomplete abelian category, then both of the induced cotorsion pairs are complete, compatible and hereditary. We also create complete cotorsion pairs ( dw, ( dw)⊥), ( ex, ( ex)⊥) and (⊥( dw), dw), (⊥( ex); ex) in a termwise manner by starting with a cotorsion pair (, ) that is cogenerated by a set. As applications of these results, we obtain more abelian model structures from the cotorsion pairs. [ABSTRACT FROM AUTHOR]