## The Relation of Cobordism to K-Theories |

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E.E. Floyd University of Virginia, Charlottesville The Relation of

E.E. Floyd University of Virginia, Charlottesville The Relation of

**Cobordism**to K-Theories 1966 Springer-Verlag. Berlin . Heidelberg. New York All rights, especially that of translation into foreign languages, reserved. Page

(C) by Springer-Verlag Berlin Heidelberg 1966. Library of Congress Catalog Card Number 66-30.143. Printed in Germany. Title No. 7348. INTRODUCTION These lectures treat certain topics relating K-theory and

(C) by Springer-Verlag Berlin Heidelberg 1966. Library of Congress Catalog Card Number 66-30.143. Printed in Germany. Title No. 7348. INTRODUCTION These lectures treat certain topics relating K-theory and

**cobordism**. Page

INTRODUCTION These lectures treat certain topics relating K-theory and

INTRODUCTION These lectures treat certain topics relating K-theory and

**cobordism**. Since new connections are in the process of being discovered by various workers, we make no attempt to be definitive but simply cover a few of our ... Page

should be noted that on the coefficient groups, 0 ° – K* (pt) = z /*e it u (pt) = is identified up to sign with the Todd genus Td : O." -> Z. In Chapter II we show among other things that to:

should be noted that on the coefficient groups, 0 ° – K* (pt) = z /*e it u (pt) = is identified up to sign with the Todd genus Td : O." -> Z. In Chapter II we show among other things that to:

**cobordism**theories determine the K-theories.### What people are saying - Write a review

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### Contents

ii | |

vi | |

Application to bundles | 11 |

Thom classes of line bundles | 18 |

Cobordism and homomorphisms into Ktheory | 25 |

The homomorphism e | 30 |

Cobordism Characteristic Classes 58 | 38 |

A theorem of Dold | 39 |

UManifolds with Framed Boundaries | 69 |

The Ubordism groups nº ſº ſº º ſº tº e º º e º º º º | 70 |

Characteristic numbers from Ktheory | 78 |

The theorem of Stong and Hattori | 82 |

Umanifolds with stably framed boundaries | 91 |

The bordism groups Q V fr | 96 |

The groups nº | 105 |

in a | 108 |

Characteristic classes in cobordism | 48 |

Characteristic classes in Ktheory | 52 |

A cobordism interpretation for K X | 65 |

Bibliography | 111 |

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### Common terms and phrases

abelian According acts Adams algebra assigning associated base point basis bordism bordism classes Chapter characteristic Chern classes Chern numbers classes closed U-manifold cobordism coefficient commutativity compact complex vector space composition consider construction COROLLARY CP(n define definition denote diagram dimension element equivalence exact exists fact fiber finite CW complex finite CW pair follows fr)—manifold function give given Hence holds homomorphism Hopf HP(n identified induced integer isomorphism K-theory line bundle linear manifold map f Moreover MU(k Namely natural Note obtain particular partition polynomial Proof prove represented respectively ring seen sequence Similarly stable tangent bundle stably framed structure SU(n sufficient Suppose theorem Thom Todd genus trivial U-structure unique vector space bundle wºn