Equivariant version of Rochlin-type congruences
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概要
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W. Zhang showed a higher dimensional version of Rochlin congruence for 8k+4-dimensional manifolds. We give an equivariant version of Zhangs theorem for 8k+4-dimensional compact Spinc-G-manifolds with spin boundary, where we define equivariant indices with values in R(G)/RSp(G). We also give a similar congruence relation for 8k-dimensional compact Spinc-G-manifolds with spin boundary, where we define equivariant indices with values in R(G)/RO(G).
- The Mathematical Society of Japanの論文
The Mathematical Society of Japan | 論文
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