Finite-upper join-closed subgroup property

This article defines a subgroup metaproperty: a property that can be evaluated to true/false for any subgroup property
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Definition

A subgorup property $p$ is termed a finite-upper join-closed subgroup property if, for any subgroup $H$ of a group $G$ , and any intermediate subgroups $K_{1}, K_{2}$ of $G$ such that $H$ satisfies $p$ in both $K_{1}$ and $K_{2}$ , we have that $H$ satisfies $p$ in the join of subgroups $⟨ K_{1}, K_{2} ⟩$ .

Relation with other metaproperties

Stronger metaproperties

Upper join-closed subgroup property

Weaker metaproperties

Permuting upper join-closed subgroup property