Commensurator

In group theory, a branch of abstract algebra, the commensurator of a subgroup H of a group G is a specific subgroup of G.

Definition

The commensurator of a subgroup H of a group G, denoted comm_G(H) or by some comm(H),^[1] is the set of all elements g of G that conjugate H and leave the result commensurable with H. In other words,

\mathrm {comm} _{G}(H)=\{g\in G:gHg^{-1}\cap H{\text{ has finite index in both }}H{\text{ and }}gHg^{-1}\}.

^[2]

Properties

comm_G(H) is a subgroup of G.
comm_G(H) = G for any compact open subgroup H.

Notes

↑ Onishchick (2000), p. 94
↑ Geoghegan (2008), p. 348

References

Geoghegan, Ross (2008), Topological Methods in Group Theory, Graduate Texts in Mathematics, Springer, ISBN 978-0-387-74611-1 .
Onishchik, A.L.; Vinberg, E.B. (2000), Lie groups and Lie algebras II, Encyclopaedia of mathematical sciences, Springer, ISBN 3-540-50585-7 .

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Commensurator

Definition

Properties

See also

Notes

References