Geometric 3-manifolds

Contents 1 Introduction 2 Construction and examples 3 Invariants 4 Classification/Characterization 5 Further discussion 6 References

1 Introduction

Let a group $<!-- COMMENT: To achieve a unified layout, along with using the template below, please OBSERVE the following: besides, $...$ and $$...$$, you should use two environments: - For statements like Theorem, Lemma, Definition etc., use e.g. {{beginthm|Theorem 1|(Milnor)}} ... ... ... {{endthm}}. - For references, use e.g. {{cite|Milnor1958b}}. END OF COMMENT --> == Introduction == <wikitex>; Let a group $G$ act on a manifold $X$ by homeomorphisms. A $\left(G,X\right)$-manifold is a manifold $M$ with a $\left(G,X\right)$-atlas, that is, a collection $\left\{\left(U_i,\phi_i\right):i\in I\right\}$ of homeomorphisms $$\phi_i:U_i\rightarrow \phi_i\left(U_i\right)\subset X$$ onto open subsets of $X$ such that all coordinate changes $$\gamma_{ij}=\phi_i\phi_j^{-1}:\phi_i\left(U_i\cap U_j\right)\rightarrow \phi_j\left(U_i\cap U_j\right)$$ are restrictions of elements of $G$. </wikitex> == Construction and examples == <wikitex>; ... </wikitex> == Invariants == <wikitex>; ... </wikitex> == Classification/Characterization == <wikitex>; ... </wikitex> == Further discussion == <wikitex>; ... </wikitex> == References == {{#RefList:}} <!-- Please modify these headings or choose other headings according to your needs. --> [[Category:Manifolds]] {{Stub}}G$ act on a manifold $X$ by homeomorphisms.

A $\left(G,X\right)$-manifold is a manifold $M$ with a $\left(G,X\right)$-atlas, that is, a collection $\left\{\left(U_i,\phi_i\right):i\in I\right\}$ of homeomorphisms onto open subsets of $X$ such that all coordinate changes are restrictions of elements of $G$.

2 Construction and examples

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3 Invariants

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4 Classification/Characterization

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5 Further discussion

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6 References

This page has not been refereed. The information given here might be incomplete or provisional.