Milnor Hypersurfaces
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For fixed natural numbers $i \geq j \geq 0$, $H_{ij}$ is defined as the hypersurface in $\CP^i \times \CP^j$ satisfying the equation $x_0z_0 + ... + x_jz_j = 0$, where $x_k$ and $z_k$ are homogeneous coordinates for $\CP^i$ and $\CP^j$ respectively. | For fixed natural numbers $i \geq j \geq 0$, $H_{ij}$ is defined as the hypersurface in $\CP^i \times \CP^j$ satisfying the equation $x_0z_0 + ... + x_jz_j = 0$, where $x_k$ and $z_k$ are homogeneous coordinates for $\CP^i$ and $\CP^j$ respectively. | ||
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+ | The role of these manifolds in complex bordism is descbribed on the page [[Complex bordism#Milnor hypersurfaces|Complex bordism]]. | ||
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+ | == Invariants == | ||
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+ | ... | ||
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Revision as of 22:53, 31 May 2012
This page has not been refereed. The information given here might be incomplete or provisional. |
Contents |
1 Introduction
The Milnor hypersurfaces, denoted , are a family of smooth manifolds that generate (with redundancy) the complex bordism ring.
2 Construction and examples
For fixed natural numbers , is defined as the hypersurface in satisfying the equation , where and are homogeneous coordinates for and respectively.
The role of these manifolds in complex bordism is descbribed on the page Complex bordism.
3 Invariants
...