Surgery obstruction groups
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== Introduction == | == Introduction == | ||
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The surgery obstruction groups $L_n(\bZ\pi, w)$ of C.T.C. Wall \cite{wall-book}, \cite{wall-VI} contain the obstructions to doing surgery on a degree 1 normal map $(f,b)\colon M \to X$ to obtain a homotopy equivalence. In this setting, $X$ is an $n$-dimensional Poincar\'e complex $\pi = \pi_1(X, x_0)$ is the fundamental group of $X$, and $w = w_1(X)$ is the first Stiefel-Whitney class depend on a coefficient ring $R$, a discrete group $\pi$ and an orientation character $w\colon \pi \to \{\pm 1\}$. In general the surgery obstruction groups are abelian groups. For finite groups $\pi$ the $L$-groups are finitely-generated and the only torsion is $2$-primary. | The surgery obstruction groups $L_n(\bZ\pi, w)$ of C.T.C. Wall \cite{wall-book}, \cite{wall-VI} contain the obstructions to doing surgery on a degree 1 normal map $(f,b)\colon M \to X$ to obtain a homotopy equivalence. In this setting, $X$ is an $n$-dimensional Poincar\'e complex $\pi = \pi_1(X, x_0)$ is the fundamental group of $X$, and $w = w_1(X)$ is the first Stiefel-Whitney class depend on a coefficient ring $R$, a discrete group $\pi$ and an orientation character $w\colon \pi \to \{\pm 1\}$. In general the surgery obstruction groups are abelian groups. For finite groups $\pi$ the $L$-groups are finitely-generated and the only torsion is $2$-primary. | ||
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== References == | == References == | ||
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Revision as of 11:03, 8 June 2010
The user responsible for this page is Hambleton. No other user may edit this page at present. |
1 Introduction
\newcommand{\bZ}{\mathbf Z} The surgery obstruction groups of C.T.C. Wall [wall-book], [wall-VI] contain the obstructions to doing surgery on a degree 1 normal map to obtain a homotopy equivalence. In this setting, is an -dimensional Poincar\'e complex is the fundamental group of , and is the first Stiefel-Whitney class depend on a coefficient ring , a discrete group and an orientation character . In general the surgery obstruction groups are abelian groups. For finite groups the -groups are finitely-generated and the only torsion is -primary.
A Guide to the Calculation of Surgery Obstruction Groups, Hambleton & Taylor (2000), pp. 1-3
2 References
This page has not been refereed. The information given here might be incomplete or provisional. |