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显然C1(K)=C1(K1)⊕C2(K2),Z1(K1)⊕Z2(K2)⊂Z1(K).设z1∈Z1(K),且z1=c1+c2,ci∈C1(Ki)(i=1,2).于是,∂c1+∂c2=0.而∂c1=-∂c2在K0=a0中,它必为na0.又从指数的意义知n=0.于是∂c1=∂c2=0,ci∈Z1(Ki)(i=1,2).于是Z1(K)=Z1(K1)⊕Z2(K2).作商群得到结论.
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3.(1)设z=c1+c2,ci∈C1(Ki)(i=1,2).则∂c1+∂c2=0.而∂c1=-∂c2是K0中指数为0的0维链,从而由K0的连通性得知存在K0的一个1维链c3使得∂c3=∂c1.记z1=c1-c3,z2=c2+c3,则∂zi=0,且z=z1+z2.
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(2)证法类似(1).
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(3)设c∈Cq+1(K),∂c=z1+z2.记c=c1+c2,ci∈Cq+1(Ki)(i=1,2).则∂c1+∂c2=z1+z2,从而∂c1-z1=-∂c2+z2是K0中的闭链.由于Hq(K0)=0,∂ci-zi∈Bq(Ki),从而zi∈Bq(Ki)(i=1,2).
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4.利用上题的结果.
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§4
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2.
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3.
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4.
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6.
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7.当q≠0时,Hq(K;G)=0.
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第 七 章
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§1
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3.设Carkx=(a0,a1,…,aq),则λi>0,∀i=0,1,…,q.根据的定义,并且
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于是在φ(Carkx)的重心坐标全大于0,从而
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5..显然.
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