Quadratic forms for surgery
(Difference between revisions)
m (Created page with "{{Stub}} == Introduction == <wikitex>; Let $(f, b) \colon M \to X$ be a degree one normal map from a manifold of dimension $2q$. Then the surgery kernel of $(f, b)$, $K_...") |
|||
| Line 2: | Line 2: | ||
== Introduction == | == Introduction == | ||
<wikitex>; | <wikitex>; | ||
| − | Let $(f, b) \colon M \to X$ be a [[degree one normal map]] from a manifold of dimension $2q$. Then the [[surgery kernel]] of $(f, b)$, $K_q(M)$, comes equipped with a subtle and crucial quadratic refinement. | + | Let $(f, b) \colon M \to X$ be a [[degree one normal map]] from a manifold of dimension $2q$. Then the [[surgery kernel]] of $(f, b)$, $K_q(M)$, comes equipped with a subtle and crucial quadratic refinement. This page describes both the algebraic and geometric aspects of such quadratic refinements |
</wikitex> | </wikitex> | ||
== Topology == | == Topology == | ||
Revision as of 23:23, 5 April 2011
|
This page has not been refereed. The information given here might be incomplete or provisional. |
Contents |
1 Introduction
Let 
be a degree one normal map from a manifold of dimension 
. Then the surgery kernel of 
, 
, comes equipped with a subtle and crucial quadratic refinement. This page describes both the algebraic and geometric aspects of such quadratic refinements
