WNSCDIN-relatively weakly closed subgroup

Definition
A subgroup $$H$$ of a group $$K$$ is termed WNSCDIN-relatively weakly closed in $$K$$ if whenever $$K$$ is embedded as a defining ingredient::WNSCDIN-subgroup of $$G$$, $$H$$ is weakly closed in $$K$$ relative to $$G$$.

Stronger properties

 * Weaker than::Isomorph-free subgroup
 * Weaker than::Isomorph-normal characteristic subgroup:

Weaker properties

 * Stronger than::Left-transitively WNSCDIN-subgroup