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coset
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Contents
Definition
For a group and a subgroup, the left/right cosets are the -orbits in under the action by left/right multiplication.
G/H = \{g H | g \in G\}
\,.
Properties
The coset inherits the structure of a group if is a normal subgroup.
The natural projection , mapping the element to the element , realizes as an -principal bundle over . We therefore have a homotopy pullback
\array{
G & \to&*
\\
\downarrow && \downarrow
\\
G/H &\to& \mathbf{B}H
}
where is the delooping groupoid of . By the pasting law for homotopy pullbacks then we get the homotopy pullback
\array{
G/H & \to&\mathbf{B}H
\\
\downarrow && \downarrow
\\
* &\to& \mathbf{B}G
}
Revised on December 30, 2012 14:13:23
by
Urs Schreiber
(89.204.130.57)