Automorph-conjugacy is not finite-intersection-closed: Difference between revisions

This article gives the statement, and possibly proof, of a subgroup property (i.e., automorph-conjugate subgroup) not satisfying a subgroup metaproperty (i.e., finite-intersection-closed subgroup property).
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Statement

We can have a group ${\displaystyle G}$ with two automorph-conjugate subgroups ${\displaystyle H,K\le G}$, such that ${\displaystyle H\cap K}$ is not automorph-conjugate in ${\displaystyle G}$.

Proof

Example in the symmetric group

Further information: symmetric group:S6

(This example demonstrates the stronger fact that automorph-conjugacy is not finite-conjugate-intersection-closed).

Let ${\displaystyle G}$ be the symmetric group on six letters: ${\displaystyle \{1,2,3,4,5,6\}}$. Let ${\displaystyle H,K}$ be the following 2-Sylow subgroups of ${\displaystyle G}$:

${\displaystyle H=⟨(1,3,2,4),(1,2),(5,6)⟩;K=⟨(1,2),(3,5,4,6),(5,6)⟩}$

In other words, ${\displaystyle H}$ is the internal direct product of a 2-Sylow subgroup on ${\displaystyle \{1,2,3,4\}}$ with the 2-Sylow subgroup on ${\displaystyle \{5,6\}}$, while ${\displaystyle K}$ is the internal direct product of the 2-Sylow subgroup on ${\displaystyle \{1,2\}}$ with a 2-Sylow subgroup on ${\displaystyle \{3,4,5,6\}}$.

The intersection is given by:

${\displaystyle H\cap K=⟨(1,2),(3,4),(5,6)⟩}$.

Now, note that:

• Both ${\displaystyle H}$ and ${\displaystyle K}$ are automorph-conjugate, because they are both Sylow subgroups, and Sylow implies automorph-conjugate.
• ${\displaystyle H\cap K}$ is not automorph-conjugate. To see this, note that ${\displaystyle G}$ has an outer automorphism that sends transpositions to triple transpositions. Under this automorphism, ${\displaystyle H\cap K}$ goes to a subgroup of ${\displaystyle G}$ that contains three commuting triple transpositions. If this is conjugate to ${\displaystyle H\cap K}$, then ${\displaystyle H\cap K}$ should also contain three commuting triple transpositions. But it doesn't.