In　this　paper,　we　consider　a　defect-correction　stabilized　finite　element　method　for　incompressible　Navier-Stokes　equations　with　friction　boundary　conditions　whose　variational　formulation　is　the　variational　inequality　problem　of　the　second　kind　with　Navier-Stokes　operator.　In　the　defect　step,　an　artificial　viscosity　parameter　a　is　added　to　the　Reynolds　number　as　a　stability　factor,　and　the　Oseen　iterative　scheme　is　applied　in　the　correction　step.　H-1　x　L-2　error　estimations　are　derived　for　the　one-step　defect-correction　stabilized　finite　element　method.　In　the　end,　some　numerical　results　are　presented　to　verify　the　theoretical　analysis.　(C)　2014　IMACS.　Published　by　Elsevier　B.V.　All　rights　reserved.