This　paper　is　concerned　with　the　large　time　behavior　of　solutions　for　the　Cauchy　problem　to　the　compressible　Navier-Stokes　equations　for　a　react-ing　mixture　with　zero　viscosity　in　one　dimension.　If　the　corresponding　Riemann　problem　for　the　compressible　Euler　system　admits　the　solutions　consisting　of　rarefaction　waves　and　contact　discontinuity,　it　is　shown　that　the　composition　of　two　rarefaction　waves　with　a　viscous　contact　wave　is　asymptotically　sta-ble,　while　the　strength　of　the　composite　wave　and　the　initial　perturbation　are　suitably　small.