Directed union-closed group property

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This article defines a group property: a property that can be evaluated to true/false for any given group, invariant under isomorphism
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Definition

Symbol-free definition

A group property is termed directed union-closed if given any directed set of subgroups of the group, each satisfying the property, their union also satisfies the property.

Definition with symbols

A group property ${\displaystyle p}$ is termed directed union-closed if given any group ${\displaystyle G}$, any nonempty directed set ${\displaystyle I}$, and a collection of subgroups ${\displaystyle H_i,i\in I}$ of ${\displaystyle G}$ such that ${\displaystyle i<j⟹H_i\le H_j}$, such that each ${\displaystyle H_i}$ satisfies ${\displaystyle p}$, the union:

${\displaystyle {\bigcup }_{i\in I}{H}_i}$

also satisfies ${\displaystyle p}$.

Relation with other metaproperties

Stronger metaproperties

• Join-closed group property
• Union-closed group property
• Varietal group property: For full proof, refer: Varietal implies directed union-closed

Weaker metaproperties

• ACU-closed group property