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n和r为偶数,k为奇数,n>r>k>0,λ≥2为整数.G是有n个顶点、边连通度为λ的r-正则图.若λ和n满足下列条件:(1)当r≥2k时,r-λk>0 且 nk>0 with n and r even and k odd, and let λ≥2 be an integer. Let G be an r-regular graph of even order n with edge-connectivity λ. If λ and n meet the requirements as follow:(1) r≥2k,r-λk>0 and n<1+(1+r)k; (2) r<2k,r+λk-λr>0 and n<1+(1+r)(r-k),then G is k-covered.