Normality is strongly UL-intersection-closed

This article gives the statement, and possibly proof, of a subgroup property (i.e., normal subgroup) satisfying a subgroup metaproperty (i.e., strongly UL-intersection-closed subgroup property)
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Statement

Statement with symbols

Suppose ${\displaystyle G}$ is a group, ${\displaystyle I}$ is an indexing set, and for each ${\displaystyle i\in I}$, we have subgroups ${\displaystyle H_i\le K_i\le G}$ such that ${\displaystyle H_i}$ is normal in ${\displaystyle K_i}$. Then, the intersection of the ${\displaystyle H_i}$s is normal in the intersection of the ${\displaystyle K_i}$s.

Related facts

Applications

Combining this with the fact that UL-intersection-closedness is a [[composition-closed subgroup metaproperty, we can conclude that the property of being ${\displaystyle k}$-subnormal, for any fixed ${\displaystyle k}$, is also strongly intersection-closed.

Further information: UL-intersection-closedness is composition-closed

Weaker facts

• Normality is strongly intersection-closed
• Normality satisfies transfer condition
• Normality satisfies intermediate subgroup condition